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// Please do not edit this file; modify original file instead.
// The copyright and license terms as defined for the original file apply to
// this header file considered to be the "object code" form of the original source.
#ifndef _BSplCLib_HeaderFile
#define _BSplCLib_HeaderFile
#include <Standard.hxx>
#include <Standard_DefineAlloc.hxx>
#include <Standard_Macro.hxx>
#include <Standard_Real.hxx>
#include <Standard_Integer.hxx>
#include <Standard_Boolean.hxx>
#include <BSplCLib_KnotDistribution.hxx>
#include <BSplCLib_MultDistribution.hxx>
#include <GeomAbs_BSplKnotDistribution.hxx>
#include <Handle_TColStd_HArray1OfReal.hxx>
#include <Handle_TColStd_HArray1OfInteger.hxx>
#include <BSplCLib_EvaluatorFunction.hxx>
class TColStd_Array1OfReal;
class TColStd_Array1OfInteger;
class TColgp_Array1OfPnt;
class TColgp_Array1OfPnt2d;
class gp_Pnt;
class gp_Pnt2d;
class gp_Vec;
class gp_Vec2d;
class math_Matrix;
class TColStd_HArray1OfReal;
class TColStd_HArray1OfInteger;
//! BSplCLib B-spline curve Library.
//!
//! The BSplCLib package is a basic library for BSplines. It
//! provides three categories of functions.
//!
//! * Management methods to process knots and multiplicities.
//!
//! * Multi-Dimensions spline methods. BSpline methods where
//! poles have an arbitrary number of dimensions. They divides
//! in two groups :
//!
//! - Global methods modifying the whole set of poles. The
//! poles are described by an array of Reals and a
//! Dimension. Example : Inserting knots.
//!
//! - Local methods computing points and derivatives. The
//! poles are described by a pointer on a local array of
//! Reals and a Dimension. The local array is modified.
//!
//! * 2D and 3D spline curves methods.
//!
//! Methods for 2d and 3d BSplines curves rational or not
//! rational.
//!
//! Those methods have the following structure :
//!
//! - They extract the pole informations in a working array.
//!
//! - They process the working array with the
//! multi-dimension methods. (for example a 3d rational
//! curve is processed as a 4 dimension curve).
//!
//! - They get back the result in the original dimension.
//!
//! Note that the bspline surface methods found in the
//! package BSplSLib uses the same structure and rely on
//! BSplCLib.
//!
//! In the following list of methods the 2d and 3d curve
//! methods will be described with the corresponding
//! multi-dimension method.
//!
//! The 3d or 2d B-spline curve is defined with :
//!
//! . its control points : TColgp_Array1OfPnt(2d) Poles
//! . its weights : TColStd_Array1OfReal Weights
//! . its knots : TColStd_Array1OfReal Knots
//! . its multiplicities : TColStd_Array1OfInteger Mults
//! . its degree : Standard_Integer Degree
//! . its periodicity : Standard_Boolean Periodic
//!
//! Warnings :
//! The bounds of Poles and Weights should be the same.
//! The bounds of Knots and Mults should be the same.
//!
//! Weights can be a null reference (BSplCLib::NoWeights())
//! the curve is non rational.
//!
//! Mults can be a null reference (BSplCLib::NoMults())
//! the knots are "flat" knots.
//!
//! KeyWords :
//! B-spline curve, Functions, Library
//!
//! References :
//! . A survey of curves and surfaces methods in CADG Wolfgang
//! BOHM CAGD 1 (1984)
//! . On de Boor-like algorithms and blossoming Wolfgang BOEHM
//! cagd 5 (1988)
//! . Blossoming and knot insertion algorithms for B-spline curves
//! Ronald N. GOLDMAN
//! . Modelisation des surfaces en CAO, Henri GIAUME Peugeot SA
//! . Curves and Surfaces for Computer Aided Geometric Design,
//! a practical guide Gerald Farin
class BSplCLib
{
public:
DEFINE_STANDARD_ALLOC
//! This routine searches the position of the real
//! value X in the ordered set of real values XX.
//!
//! The elements in the table XX are either
//! monotonically increasing or monotonically
//! decreasing.
//!
//! The input value Iloc is used to initialize the
//! algorithm : if Iloc is outside of the bounds
//! [XX.Lower(), -- XX.Upper()] the bisection algorithm
//! is used else the routine searches from a previous
//! known position by increasing steps then converges
//! by bisection.
//!
//! This routine is used to locate a knot value in a
//! set of knots.
Standard_EXPORT static void Hunt (const TColStd_Array1OfReal& XX, const Standard_Real X, Standard_Integer& Iloc) ;
//! Computes the index of the knots value which gives
//! the start point of the curve.
Standard_EXPORT static Standard_Integer FirstUKnotIndex (const Standard_Integer Degree, const TColStd_Array1OfInteger& Mults) ;
//! Computes the index of the knots value which gives
//! the end point of the curve.
Standard_EXPORT static Standard_Integer LastUKnotIndex (const Standard_Integer Degree, const TColStd_Array1OfInteger& Mults) ;
//! Computes the index of the flats knots sequence
//! corresponding to <Index> in the knots sequence
//! which multiplicities are <Mults>.
Standard_EXPORT static Standard_Integer FlatIndex (const Standard_Integer Degree, const Standard_Integer Index, const TColStd_Array1OfInteger& Mults, const Standard_Boolean Periodic) ;
//! Locates the parametric value U in the knots
//! sequence between the knot K1 and the knot K2.
//! The value return in Index verifies.
//!
//! Knots(Index) <= U < Knots(Index + 1)
//! if U <= Knots (K1) then Index = K1
//! if U >= Knots (K2) then Index = K2 - 1
//!
//! If Periodic is True U may be modified to fit in
//! the range Knots(K1), Knots(K2). In any case the
//! correct value is returned in NewU.
//!
//! Warnings :Index is used as input data to initialize the
//! searching function.
//! Warning: Knots have to be "withe repetitions"
Standard_EXPORT static void LocateParameter (const Standard_Integer Degree, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const Standard_Real U, const Standard_Boolean IsPeriodic, const Standard_Integer FromK1, const Standard_Integer ToK2, Standard_Integer& KnotIndex, Standard_Real& NewU) ;
//! Locates the parametric value U in the knots
//! sequence between the knot K1 and the knot K2.
//! The value return in Index verifies.
//!
//! Knots(Index) <= U < Knots(Index + 1)
//! if U <= Knots (K1) then Index = K1
//! if U >= Knots (K2) then Index = K2 - 1
//!
//! If Periodic is True U may be modified to fit in
//! the range Knots(K1), Knots(K2). In any case the
//! correct value is returned in NewU.
//!
//! Warnings :Index is used as input data to initialize the
//! searching function.
//! Warning: Knots have to be "flat"
Standard_EXPORT static void LocateParameter (const Standard_Integer Degree, const TColStd_Array1OfReal& Knots, const Standard_Real U, const Standard_Boolean IsPeriodic, const Standard_Integer FromK1, const Standard_Integer ToK2, Standard_Integer& KnotIndex, Standard_Real& NewU) ;
Standard_EXPORT static void LocateParameter (const Standard_Integer Degree, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const Standard_Real U, const Standard_Boolean Periodic, Standard_Integer& Index, Standard_Real& NewU) ;
//! Finds the greatest multiplicity in a set of knots
//! between K1 and K2. Mults is the multiplicity
//! associated with each knot value.
Standard_EXPORT static Standard_Integer MaxKnotMult (const TColStd_Array1OfInteger& Mults, const Standard_Integer K1, const Standard_Integer K2) ;
//! Finds the lowest multiplicity in a set of knots
//! between K1 and K2. Mults is the multiplicity
//! associated with each knot value.
Standard_EXPORT static Standard_Integer MinKnotMult (const TColStd_Array1OfInteger& Mults, const Standard_Integer K1, const Standard_Integer K2) ;
//! Returns the number of poles of the curve. Returns 0 if
//! one of the multiplicities is incorrect.
//!
//! * Non positive.
//!
//! * Greater than Degree, or Degree+1 at the first and
//! last knot of a non periodic curve.
//!
//! * The last periodicity on a periodic curve is not
//! equal to the first.
Standard_EXPORT static Standard_Integer NbPoles (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfInteger& Mults) ;
//! Returns the length of the sequence of knots with
//! repetition.
//!
//! Periodic :
//!
//! Sum(Mults(i), i = Mults.Lower(); i <= Mults.Upper());
//!
//! Non Periodic :
//!
//! Sum(Mults(i); i = Mults.Lower(); i < Mults.Upper())
//! + 2 * Degree
Standard_EXPORT static Standard_Integer KnotSequenceLength (const TColStd_Array1OfInteger& Mults, const Standard_Integer Degree, const Standard_Boolean Periodic) ;
Standard_EXPORT static void KnotSequence (const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColStd_Array1OfReal& KnotSeq, const Standard_Boolean Periodic = Standard_False) ;
//! Computes the sequence of knots KnotSeq with
//! repetition of the knots of multiplicity greater
//! than 1.
//!
//! Length of KnotSeq must be KnotSequenceLength(Mults,Degree,Periodic)
Standard_EXPORT static void KnotSequence (const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const Standard_Integer Degree, const Standard_Boolean Periodic, TColStd_Array1OfReal& KnotSeq) ;
//! Returns the length of the sequence of knots (and
//! Mults) without repetition.
Standard_EXPORT static Standard_Integer KnotsLength (const TColStd_Array1OfReal& KnotSeq, const Standard_Boolean Periodic = Standard_False) ;
//! Computes the sequence of knots Knots without
//! repetition of the knots of multiplicity greater
//! than 1.
//!
//! Length of <Knots> and <Mults> must be
//! KnotsLength(KnotSequence,Periodic)
Standard_EXPORT static void Knots (const TColStd_Array1OfReal& KnotSeq, TColStd_Array1OfReal& Knots, TColStd_Array1OfInteger& Mults, const Standard_Boolean Periodic = Standard_False) ;
//! Analyses if the knots distribution is "Uniform"
//! or "NonUniform" between the knot FromK1 and the
//! knot ToK2. There is no repetition of knot in the
//! knots'sequence <Knots>.
Standard_EXPORT static BSplCLib_KnotDistribution KnotForm (const TColStd_Array1OfReal& Knots, const Standard_Integer FromK1, const Standard_Integer ToK2) ;
//! Analyses the distribution of multiplicities between
//! the knot FromK1 and the Knot ToK2.
Standard_EXPORT static BSplCLib_MultDistribution MultForm (const TColStd_Array1OfInteger& Mults, const Standard_Integer FromK1, const Standard_Integer ToK2) ;
//! Analyzes the array of knots.
//! Returns the form and the maximum knot multiplicity.
Standard_EXPORT static void KnotAnalysis (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& CKnots, const TColStd_Array1OfInteger& CMults, GeomAbs_BSplKnotDistribution& KnotForm, Standard_Integer& MaxKnotMult) ;
//! Reparametrizes a B-spline curve to [U1, U2].
//! The knot values are recomputed such that Knots (Lower) = U1
//! and Knots (Upper) = U2 but the knot form is not modified.
//! Warnings :
//! In the array Knots the values must be in ascending order.
//! U1 must not be equal to U2 to avoid division by zero.
Standard_EXPORT static void Reparametrize (const Standard_Real U1, const Standard_Real U2, TColStd_Array1OfReal& Knots) ;
//! Reverses the array knots to become the knots
//! sequence of the reversed curve.
Standard_EXPORT static void Reverse (TColStd_Array1OfReal& Knots) ;
//! Reverses the array of multiplicities.
Standard_EXPORT static void Reverse (TColStd_Array1OfInteger& Mults) ;
//! Reverses the array of poles. Last is the index of
//! the new first pole. On a non periodic curve last
//! is Poles.Upper(). On a periodic curve last is
//!
//! (number of flat knots - degree - 1)
//!
//! or
//!
//! (sum of multiplicities(but for the last) + degree
//! - 1)
Standard_EXPORT static void Reverse (TColgp_Array1OfPnt& Poles, const Standard_Integer Last) ;
//! Reverses the array of poles.
Standard_EXPORT static void Reverse (TColgp_Array1OfPnt2d& Poles, const Standard_Integer Last) ;
//! Reverses the array of poles.
Standard_EXPORT static void Reverse (TColStd_Array1OfReal& Weights, const Standard_Integer Last) ;
//! Returns False if all the weights of the array <Weights>
//! between I1 an I2 are identic. Epsilon is used for
//! comparing weights. If Epsilon is 0. the Epsilon of the
//! first weight is used.
Standard_EXPORT static Standard_Boolean IsRational (const TColStd_Array1OfReal& Weights, const Standard_Integer I1, const Standard_Integer I2, const Standard_Real Epsilon = 0.0) ;
//! returns the degree maxima for a BSplineCurve.
static Standard_Integer MaxDegree() ;
//! Perform the Boor algorithm to evaluate a point at
//! parameter <U>, with <Degree> and <Dimension>.
//!
//! Poles is an array of Reals of size
//!
//! <Dimension> * <Degree>+1
//!
//! Containing the poles. At the end <Poles> contains
//! the current point.
Standard_EXPORT static void Eval (const Standard_Real U, const Standard_Integer Degree, Standard_Real& Knots, const Standard_Integer Dimension, Standard_Real& Poles) ;
//! Performs the Boor Algorithm at parameter <U> with
//! the given <Degree> and the array of <Knots> on the
//! poles <Poles> of dimension <Dimension>. The schema
//! is computed until level <Depth> on a basis of
//! <Length+1> poles.
//!
//! * Knots is an array of reals of length :
//!
//! <Length> + <Degree>
//!
//! * Poles is an array of reals of length :
//!
//! (2 * <Length> + 1) * <Dimension>
//!
//! The poles values must be set in the array at the
//! positions.
//!
//! 0..Dimension,
//!
//! 2 * Dimension ..
//! 3 * Dimension
//!
//! 4 * Dimension ..
//! 5 * Dimension
//!
//! ...
//!
//! The results are found in the array poles depending
//! on the Depth. (See the method GetPole).
Standard_EXPORT static void BoorScheme (const Standard_Real U, const Standard_Integer Degree, Standard_Real& Knots, const Standard_Integer Dimension, Standard_Real& Poles, const Standard_Integer Depth, const Standard_Integer Length) ;
//! Compute the content of Pole before the BoorScheme.
//! This method is used to remove poles.
//!
//! U is the poles to remove, Knots should contains the
//! knots of the curve after knot removal.
//!
//! The first and last poles do not change, the other
//! poles are computed by averaging two possible values.
//! The distance between the two possible poles is
//! computed, if it is higher than <Tolerance> False is
//! returned.
Standard_EXPORT static Standard_Boolean AntiBoorScheme (const Standard_Real U, const Standard_Integer Degree, Standard_Real& Knots, const Standard_Integer Dimension, Standard_Real& Poles, const Standard_Integer Depth, const Standard_Integer Length, const Standard_Real Tolerance) ;
//! Computes the poles of the BSpline giving the
//! derivatives of order <Order>.
//!
//! The formula for the first order is
//!
//! Pole(i) = Degree * (Pole(i+1) - Pole(i)) /
//! (Knots(i+Degree+1) - Knots(i+1))
//!
//! This formula is repeated (Degree is decremented at
//! each step).
Standard_EXPORT static void Derivative (const Standard_Integer Degree, Standard_Real& Knots, const Standard_Integer Dimension, const Standard_Integer Length, const Standard_Integer Order, Standard_Real& Poles) ;
//! Performs the Bohm Algorithm at parameter <U>. This
//! algorithm computes the value and all the derivatives
//! up to order N (N <= Degree).
//!
//! <Poles> is the original array of poles.
//!
//! The result in <Poles> is the value and the
//! derivatives. Poles[0] is the value, Poles[Degree]
//! is the last derivative.
Standard_EXPORT static void Bohm (const Standard_Real U, const Standard_Integer Degree, const Standard_Integer N, Standard_Real& Knots, const Standard_Integer Dimension, Standard_Real& Poles) ;
//! Used as argument for a non rational curve.
static TColStd_Array1OfReal& NoWeights() ;
//! Used as argument for a flatknots evaluation.
static TColStd_Array1OfInteger& NoMults() ;
//! Stores in LK the usefull knots for the BoorSchem
//! on the span Knots(Index) - Knots(Index+1)
Standard_EXPORT static void BuildKnots (const Standard_Integer Degree, const Standard_Integer Index, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& LK) ;
//! Return the index of the first Pole to use on the
//! span Mults(Index) - Mults(Index+1). This index
//! must be added to Poles.Lower().
Standard_EXPORT static Standard_Integer PoleIndex (const Standard_Integer Degree, const Standard_Integer Index, const Standard_Boolean Periodic, const TColStd_Array1OfInteger& Mults) ;
Standard_EXPORT static void BuildEval (const Standard_Integer Degree, const Standard_Integer Index, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, Standard_Real& LP) ;
Standard_EXPORT static void BuildEval (const Standard_Integer Degree, const Standard_Integer Index, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, Standard_Real& LP) ;
//! Copy in <LP> the poles and weights for the Eval
//! scheme. starting from Poles(Poles.Lower()+Index)
Standard_EXPORT static void BuildEval (const Standard_Integer Degree, const Standard_Integer Index, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, Standard_Real& LP) ;
//! Copy in <LP> poles for <Dimension> Boor scheme.
//! Starting from <Index> * <Dimension>, copy
//! <Length+1> poles.
Standard_EXPORT static void BuildBoor (const Standard_Integer Index, const Standard_Integer Length, const Standard_Integer Dimension, const TColStd_Array1OfReal& Poles, Standard_Real& LP) ;
//! Returns the index in the Boor result array of the
//! poles <Index>. If the Boor algorithm was perform
//! with <Length> and <Depth>.
Standard_EXPORT static Standard_Integer BoorIndex (const Standard_Integer Index, const Standard_Integer Length, const Standard_Integer Depth) ;
//! Copy the pole at position <Index> in the Boor
//! scheme of dimension <Dimension> to <Position> in
//! the array <Pole>. <Position> is updated.
Standard_EXPORT static void GetPole (const Standard_Integer Index, const Standard_Integer Length, const Standard_Integer Depth, const Standard_Integer Dimension, Standard_Real& LocPoles, Standard_Integer& Position, TColStd_Array1OfReal& Pole) ;
//! Returns in <NbPoles, NbKnots> the new number of poles
//! and knots if the sequence of knots <AddKnots,
//! AddMults> is inserted in the sequence <Knots, Mults>.
//!
//! Epsilon is used to compare knots for equality.
//!
//! If Add is True the multiplicities on equal knots are
//! added.
//!
//! If Add is False the max value of the multiplicities is
//! kept.
//!
//! Return False if :
//! The knew knots are knot increasing.
//! The new knots are not in the range.
Standard_EXPORT static Standard_Boolean PrepareInsertKnots (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& AddKnots, const TColStd_Array1OfInteger& AddMults, Standard_Integer& NbPoles, Standard_Integer& NbKnots, const Standard_Real Epsilon, const Standard_Boolean Add = Standard_True) ;
Standard_EXPORT static void InsertKnots (const Standard_Integer Degree, const Standard_Boolean Periodic, const Standard_Integer Dimension, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& AddKnots, const TColStd_Array1OfInteger& AddMults, TColStd_Array1OfReal& NewPoles, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Epsilon, const Standard_Boolean Add = Standard_True) ;
Standard_EXPORT static void InsertKnots (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& AddKnots, const TColStd_Array1OfInteger& AddMults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Epsilon, const Standard_Boolean Add = Standard_True) ;
//! Insert a sequence of knots <AddKnots> with
//! multiplicities <AddMults>. <AddKnots> must be a non
//! decreasing sequence and verifies :
//!
//! Knots(Knots.Lower()) <= AddKnots(AddKnots.Lower())
//! Knots(Knots.Upper()) >= AddKnots(AddKnots.Upper())
//!
//! The NewPoles and NewWeights arrays must have a length :
//! Poles.Length() + Sum(AddMults())
//!
//! When a knot to insert is identic to an existing knot the
//! multiplicities are added.
//!
//! Epsilon is used to test knots for equality.
//!
//! When AddMult is negative or null the knot is not inserted.
//! No multiplicity will becomes higher than the degree.
//!
//! The new Knots and Multiplicities are copied in <NewKnots>
//! and <NewMults>.
//!
//! All the New arrays should be correctly dimensioned.
//!
//! When all the new knots are existing knots, i.e. only the
//! multiplicities will change it is safe to use the same
//! arrays as input and output.
Standard_EXPORT static void InsertKnots (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& AddKnots, const TColStd_Array1OfInteger& AddMults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Epsilon, const Standard_Boolean Add = Standard_True) ;
Standard_EXPORT static void InsertKnot (const Standard_Integer UIndex, const Standard_Real U, const Standard_Integer UMult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights) ;
//! Insert a new knot U of multiplicity UMult in the
//! knot sequence.
//!
//! The location of the new Knot should be given as an input
//! data. UIndex locates the new knot U in the knot sequence
//! and Knots (UIndex) < U < Knots (UIndex + 1).
//!
//! The new control points corresponding to this insertion are
//! returned. Knots and Mults are not updated.
Standard_EXPORT static void InsertKnot (const Standard_Integer UIndex, const Standard_Real U, const Standard_Integer UMult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights) ;
Standard_EXPORT static void RaiseMultiplicity (const Standard_Integer KnotIndex, const Standard_Integer Mult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights) ;
//! Raise the multiplicity of knot to <UMult>.
//!
//! The new control points are returned. Knots and Mults are
//! not updated.
Standard_EXPORT static void RaiseMultiplicity (const Standard_Integer KnotIndex, const Standard_Integer Mult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights) ;
Standard_EXPORT static Standard_Boolean RemoveKnot (const Standard_Integer Index, const Standard_Integer Mult, const Standard_Integer Degree, const Standard_Boolean Periodic, const Standard_Integer Dimension, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColStd_Array1OfReal& NewPoles, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Tolerance) ;
Standard_EXPORT static Standard_Boolean RemoveKnot (const Standard_Integer Index, const Standard_Integer Mult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Tolerance) ;
//! Decrement the multiplicity of <Knots(Index)>
//! to <Mult>. If <Mult> is null the knot is
//! removed.
//!
//! As there are two ways to compute the new poles
//! the midlle will be used as long as the
//! distance is lower than Tolerance.
//!
//! If a distance is bigger than tolerance the
//! methods returns False and the new arrays are
//! not modified.
//!
//! A low tolerance can be used to test if the
//! knot can be removed without modifying the
//! curve.
//!
//! A high tolerance can be used to "smooth" the
//! curve.
Standard_EXPORT static Standard_Boolean RemoveKnot (const Standard_Integer Index, const Standard_Integer Mult, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, const Standard_Real Tolerance) ;
//! Returns the number of knots of a curve with
//! multiplicities <Mults> after elevating the degree from
//! <Degree> to <NewDegree>. See the IncreaseDegree method
//! for more comments.
Standard_EXPORT static Standard_Integer IncreaseDegreeCountKnots (const Standard_Integer Degree, const Standard_Integer NewDegree, const Standard_Boolean Periodic, const TColStd_Array1OfInteger& Mults) ;
Standard_EXPORT static void IncreaseDegree (const Standard_Integer Degree, const Standard_Integer NewDegree, const Standard_Boolean Periodic, const Standard_Integer Dimension, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColStd_Array1OfReal& NewPoles, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults) ;
Standard_EXPORT static void IncreaseDegree (const Standard_Integer Degree, const Standard_Integer NewDegree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults) ;
Standard_EXPORT static void IncreaseDegree (const Standard_Integer Degree, const Standard_Integer NewDegree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults) ;
Standard_EXPORT static void IncreaseDegree (const Standard_Integer NewDegree, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights) ;
//! Increase the degree of a bspline (or bezier) curve
//! of dimension <Dimension> form <Degree> to
//! <NewDegree>.
//!
//! The number of poles in the new curve is :
//!
//! Poles.Length() + (NewDegree - Degree) * Number of spans
//!
//! Where the number of spans is :
//!
//! LastUKnotIndex(Mults) - FirstUKnotIndex(Mults) + 1
//!
//! for a non-periodic curve
//!
//! And Knots.Length() - 1 for a periodic curve.
//!
//! The multiplicities of all knots are increased by
//! the degree elevation.
//!
//! The new knots are usually the same knots with the
//! exception of a non-periodic curve with the first
//! and last multiplicity not equal to Degree+1 where
//! knots are removed form the start and the bottom
//! untils the sum of the multiplicities is equal to
//! NewDegree+1 at the knots corresponding to the
//! first and last parameters of the curve.
//!
//! Example : Suppose a curve of degree 3 starting
//! with following knots and multiplicities :
//!
//! knot : 0. 1. 2.
//! mult : 1 2 1
//!
//! The FirstUKnot is 2. because the sum of
//! multiplicities is Degree+1 : 1 + 2 + 1 = 4 = 3 + 1
//!
//! i.e. the first parameter of the curve is 2. and
//! will still be 2. after degree elevation. Let
//! raises this curve to degree 4. The multiplicities
//! are increased by 2.
//!
//! They become 2 3 2. But we need a sum of
//! multiplicities of 5 at knot 2. So the first knot
//! is removed and the new knots are :
//!
//! knot : 1. 2.
//! mult : 3 2
//!
//! The multipicity of the first knot may also be
//! reduced if the sum is still to big.
//!
//! In the most common situations (periodic curve or
//! curve with first and last multiplicities equals to
//! Degree+1) the knots are knot changes.
//!
//! The method IncreaseDegreeCountKnots can be used to
//! compute the new number of knots.
Standard_EXPORT static void IncreaseDegree (const Standard_Integer NewDegree, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights) ;
//! Set in <NbKnots> and <NbPolesToAdd> the number of Knots and
//! Poles of the NotPeriodic Curve identical at the
//! periodic curve with a degree <Degree> , a
//! knots-distribution with Multiplicities <Mults>.
Standard_EXPORT static void PrepareUnperiodize (const Standard_Integer Degree, const TColStd_Array1OfInteger& Mults, Standard_Integer& NbKnots, Standard_Integer& NbPoles) ;
Standard_EXPORT static void Unperiodize (const Standard_Integer Degree, const Standard_Integer Dimension, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfReal& Poles, TColStd_Array1OfInteger& NewMults, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfReal& NewPoles) ;
Standard_EXPORT static void Unperiodize (const Standard_Integer Degree, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& Knots, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, TColStd_Array1OfInteger& NewMults, TColStd_Array1OfReal& NewKnots, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights) ;
Standard_EXPORT static void Unperiodize (const Standard_Integer Degree, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& Knots, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, TColStd_Array1OfInteger& NewMults, TColStd_Array1OfReal& NewKnots, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights) ;
//! Set in <NbKnots> and <NbPoles> the number of Knots and
//! Poles of the curve resulting of the trimming of the
//! BSplinecurve definded with <degree>, <knots>, <mults>
Standard_EXPORT static void PrepareTrimming (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const Standard_Real U1, const Standard_Real U2, Standard_Integer& NbKnots, Standard_Integer& NbPoles) ;
Standard_EXPORT static void Trimming (const Standard_Integer Degree, const Standard_Boolean Periodic, const Standard_Integer Dimension, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColStd_Array1OfReal& Poles, const Standard_Real U1, const Standard_Real U2, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, TColStd_Array1OfReal& NewPoles) ;
Standard_EXPORT static void Trimming (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const Standard_Real U1, const Standard_Real U2, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, TColgp_Array1OfPnt& NewPoles, TColStd_Array1OfReal& NewWeights) ;
Standard_EXPORT static void Trimming (const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const Standard_Real U1, const Standard_Real U2, TColStd_Array1OfReal& NewKnots, TColStd_Array1OfInteger& NewMults, TColgp_Array1OfPnt2d& NewPoles, TColStd_Array1OfReal& NewWeights) ;
Standard_EXPORT static void D0 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& P) ;
Standard_EXPORT static void D0 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt& P) ;
Standard_EXPORT static void D0 (const Standard_Real U, const Standard_Integer UIndex, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt2d& P) ;
Standard_EXPORT static void D0 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& P) ;
Standard_EXPORT static void D0 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& P) ;
Standard_EXPORT static void D1 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& P, Standard_Real& V) ;
Standard_EXPORT static void D1 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt& P, gp_Vec& V) ;
Standard_EXPORT static void D1 (const Standard_Real U, const Standard_Integer UIndex, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt2d& P, gp_Vec2d& V) ;
Standard_EXPORT static void D1 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& P, gp_Vec& V) ;
Standard_EXPORT static void D1 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& P, gp_Vec2d& V) ;
Standard_EXPORT static void D2 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& P, Standard_Real& V1, Standard_Real& V2) ;
Standard_EXPORT static void D2 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt& P, gp_Vec& V1, gp_Vec& V2) ;
Standard_EXPORT static void D2 (const Standard_Real U, const Standard_Integer UIndex, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt2d& P, gp_Vec2d& V1, gp_Vec2d& V2) ;
Standard_EXPORT static void D2 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& P, gp_Vec& V1, gp_Vec& V2) ;
Standard_EXPORT static void D2 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& P, gp_Vec2d& V1, gp_Vec2d& V2) ;
Standard_EXPORT static void D3 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& P, Standard_Real& V1, Standard_Real& V2, Standard_Real& V3) ;
Standard_EXPORT static void D3 (const Standard_Real U, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt& P, gp_Vec& V1, gp_Vec& V2, gp_Vec& V3) ;
Standard_EXPORT static void D3 (const Standard_Real U, const Standard_Integer UIndex, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Pnt2d& P, gp_Vec2d& V1, gp_Vec2d& V2, gp_Vec2d& V3) ;
Standard_EXPORT static void D3 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& P, gp_Vec& V1, gp_Vec& V2, gp_Vec& V3) ;
Standard_EXPORT static void D3 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& P, gp_Vec2d& V1, gp_Vec2d& V2, gp_Vec2d& V3) ;
Standard_EXPORT static void DN (const Standard_Real U, const Standard_Integer N, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, Standard_Real& VN) ;
Standard_EXPORT static void DN (const Standard_Real U, const Standard_Integer N, const Standard_Integer Index, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Vec& VN) ;
Standard_EXPORT static void DN (const Standard_Real U, const Standard_Integer N, const Standard_Integer UIndex, const Standard_Integer Degree, const Standard_Boolean Periodic, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& Knots, const TColStd_Array1OfInteger& Mults, gp_Vec2d& V) ;
Standard_EXPORT static void DN (const Standard_Real U, const Standard_Integer N, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& P, gp_Vec& VN) ;
//! The above functions compute values and
//! derivatives in the following situations :
//!
//! * 3D, 2D and 1D
//!
//! * Rational or not Rational.
//!
//! * Knots and multiplicities or "flat knots" without
//! multiplicities.
//!
//! * The <Index> is the the localization of the
//! parameter in the knot sequence. If <Index> is out
//! of range the correct value will be searched.
//!
//! VERY IMPORTANT!!!
//! USE BSplCLib::NoWeights() as Weights argument for non
//! rational curves computations.
Standard_EXPORT static void DN (const Standard_Real U, const Standard_Integer N, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& P, gp_Vec2d& VN) ;
//! This evaluates the Bspline Basis at a
//! given parameter Parameter up to the
//! requested DerivativeOrder and store the
//! result in the array BsplineBasis in the
//! following fashion
//! BSplineBasis(1,1) =
//! value of first non vanishing
//! Bspline function which has Index FirstNonZeroBsplineIndex
//! BsplineBasis(1,2) =
//! value of second non vanishing
//! Bspline function which has Index
//! FirstNonZeroBsplineIndex + 1
//! BsplineBasis(1,n) =
//! value of second non vanishing non vanishing
//! Bspline function which has Index
//! FirstNonZeroBsplineIndex + n (n <= Order)
//! BSplineBasis(2,1) =
//! value of derivative of first non vanishing
//! Bspline function which has Index FirstNonZeroBsplineIndex
//! BSplineBasis(N,1) =
//! value of Nth derivative of first non vanishing
//! Bspline function which has Index FirstNonZeroBsplineIndex
//! if N <= DerivativeOrder + 1
Standard_EXPORT static Standard_Integer EvalBsplineBasis (const Standard_Integer Side, const Standard_Integer DerivativeOrder, const Standard_Integer Order, const TColStd_Array1OfReal& FlatKnots, const Standard_Real Parameter, Standard_Integer& FirstNonZeroBsplineIndex, math_Matrix& BsplineBasis, const Standard_Boolean isPeriodic = Standard_False) ;
//! This Builds a fully blown Matrix of
//! (ni)
//! Bi (tj)
//!
//! with i and j within 1..Order + NumPoles
//! The integer ni is the ith slot of the
//! array OrderArray, tj is the jth slot of
//! the array Parameters
Standard_EXPORT static Standard_Integer BuildBSpMatrix (const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& OrderArray, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer Degree, math_Matrix& Matrix, Standard_Integer& UpperBandWidth, Standard_Integer& LowerBandWidth) ;
//! this factors the Banded Matrix in
//! the LU form with a Banded storage of
//! components of the L matrix
//! WARNING : do not use if the Matrix is
//! totally positive (It is the case for
//! Bspline matrices build as above with
//! parameters being the Schoenberg points
Standard_EXPORT static Standard_Integer FactorBandedMatrix (math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, Standard_Integer& PivotIndexProblem) ;
//! This solves the system Matrix.X = B
//! with when Matrix is factored in LU form
//! The Array is an seen as an
//! Array[1..N][1..ArrayDimension] with N =
//! the rank of the matrix Matrix. The
//! result is stored in Array when each
//! coordinate is solved that is B is the
//! array whose values are
//! B[i] = Array[i][p] for each p in 1..ArrayDimension
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, const Standard_Integer ArrayDimension, Standard_Real& Array) ;
//! This solves the system Matrix.X = B
//! with when Matrix is factored in LU form
//! The Array has the length of
//! the rank of the matrix Matrix. The
//! result is stored in Array when each
//! coordinate is solved that is B is the
//! array whose values are
//! B[i] = Array[i][p] for each p in 1..ArrayDimension
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, TColgp_Array1OfPnt2d& Array) ;
//! This solves the system Matrix.X = B
//! with when Matrix is factored in LU form
//! The Array has the length of
//! the rank of the matrix Matrix. The
//! result is stored in Array when each
//! coordinate is solved that is B is the
//! array whose values are
//! B[i] = Array[i][p] for each p in 1..ArrayDimension
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, TColgp_Array1OfPnt& Array) ;
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, const Standard_Boolean HomogenousFlag, const Standard_Integer ArrayDimension, Standard_Real& Array, Standard_Real& Weights) ;
//! This solves the system Matrix.X = B
//! with when Matrix is factored in LU form
//! The Array is an seen as an
//! Array[1..N][1..ArrayDimension] with N =
//! the rank of the matrix Matrix. The
//! result is stored in Array when each
//! coordinate is solved that is B is the
//! array whose values are B[i] =
//! Array[i][p] for each p in
//! 1..ArrayDimension. If HomogeneousFlag ==
//! 0 the Poles are multiplied by the
//! Weights uppon Entry and once
//! interpolation is carried over the
//! result of the poles are divided by the
//! result of the interpolation of the
//! weights. Otherwise if HomogenousFlag == 1
//! the Poles and Weigths are treated homogenously
//! that is that those are interpolated as they
//! are and result is returned without division
//! by the interpolated weigths.
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, const Standard_Boolean HomogenousFlag, TColgp_Array1OfPnt2d& Array, TColStd_Array1OfReal& Weights) ;
//! This solves the system Matrix.X = B
//! with when Matrix is factored in LU form
//! The Array is an seen as an
//! Array[1..N][1..ArrayDimension] with N =
//! the rank of the matrix Matrix. The
//! result is stored in Array when each
//! coordinate is solved that is B is the
//! array whose values are
//! B[i] = Array[i][p] for each p in 1..ArrayDimension
//! If HomogeneousFlag ==
//! 0 the Poles are multiplied by the
//! Weights uppon Entry and once
//! interpolation is carried over the
//! result of the poles are divided by the
//! result of the interpolation of the
//! weights. Otherwise if HomogenousFlag == 1
//! the Poles and Weigths are treated homogenously
//! that is that those are interpolated as they
//! are and result is returned without division
//! by the interpolated weigths.
Standard_EXPORT static Standard_Integer SolveBandedSystem (const math_Matrix& Matrix, const Standard_Integer UpperBandWidth, const Standard_Integer LowerBandWidth, const Standard_Boolean HomogeneousFlag, TColgp_Array1OfPnt& Array, TColStd_Array1OfReal& Weights) ;
//! Merges two knot vector by setting the starting and
//! ending values to StartValue and EndValue
Standard_EXPORT static void MergeBSplineKnots (const Standard_Real Tolerance, const Standard_Real StartValue, const Standard_Real EndValue, const Standard_Integer Degree1, const TColStd_Array1OfReal& Knots1, const TColStd_Array1OfInteger& Mults1, const Standard_Integer Degree2, const TColStd_Array1OfReal& Knots2, const TColStd_Array1OfInteger& Mults2, Standard_Integer& NumPoles, Handle(TColStd_HArray1OfReal)& NewKnots, Handle(TColStd_HArray1OfInteger)& NewMults) ;
//! This function will compose a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] with a
//! function a(t) which is assumed to satisfy the
//! following:
//!
//! 1. F(a(t)) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots
//!
//! 2. a(t) defines a differentiable
//! isomorphism between the range of FlatKnots to the range
//! of BSplineFlatKnots which is the
//! same as the range of F(t)
//!
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//!
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of F(a(t))
Standard_EXPORT static void FunctionReparameterise (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const Standard_Integer PolesDimension, Standard_Real& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, Standard_Real& NewPoles, Standard_Integer& Status) ;
//! This function will compose a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] with a
//! function a(t) which is assumed to satisfy the
//! following:
//!
//! 1. F(a(t)) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots
//!
//! 2. a(t) defines a differentiable
//! isomorphism between the range of FlatKnots to the range
//! of BSplineFlatKnots which is the
//! same as the range of F(t)
//!
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//!
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of F(a(t))
Standard_EXPORT static void FunctionReparameterise (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColStd_Array1OfReal& NewPoles, Standard_Integer& Status) ;
//! this will compose a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] with a
//! function a(t) which is assumed to satisfy the
//! following : 1. F(a(t)) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots
//! 2. a(t) defines a differentiable
//! isomorphism between the range of FlatKnots to the range
//! of BSplineFlatKnots which is the
//! same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of F(a(t))
Standard_EXPORT static void FunctionReparameterise (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColgp_Array1OfPnt& NewPoles, Standard_Integer& Status) ;
//! this will compose a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] with a
//! function a(t) which is assumed to satisfy the
//! following : 1. F(a(t)) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots
//! 2. a(t) defines a differentiable
//! isomorphism between the range of FlatKnots to the range
//! of BSplineFlatKnots which is the
//! same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of F(a(t))
Standard_EXPORT static void FunctionReparameterise (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColgp_Array1OfPnt2d& NewPoles, Standard_Integer& Status) ;
//! this will multiply a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] by a
//! function a(t) which is assumed to satisfy the
//! following : 1. a(t) * F(t) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots 2. the range of a(t)
//! is the same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of a(t)*F(t)
Standard_EXPORT static void FunctionMultiply (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const Standard_Integer PolesDimension, Standard_Real& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, Standard_Real& NewPoles, Standard_Integer& Status) ;
//! this will multiply a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] by a
//! function a(t) which is assumed to satisfy the
//! following : 1. a(t) * F(t) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots 2. the range of a(t)
//! is the same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of a(t)*F(t)
Standard_EXPORT static void FunctionMultiply (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColStd_Array1OfReal& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColStd_Array1OfReal& NewPoles, Standard_Integer& Status) ;
//! this will multiply a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] by a
//! function a(t) which is assumed to satisfy the
//! following : 1. a(t) * F(t) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots 2. the range of a(t)
//! is the same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of a(t)*F(t)
Standard_EXPORT static void FunctionMultiply (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColgp_Array1OfPnt2d& NewPoles, Standard_Integer& Status) ;
//! this will multiply a given Vectorial BSpline F(t)
//! defined by its BSplineDegree and BSplineFlatKnotsl,
//! its Poles array which are coded as an array of Real
//! of the form [1..NumPoles][1..PolesDimension] by a
//! function a(t) which is assumed to satisfy the
//! following : 1. a(t) * F(t) is a polynomial BSpline
//! that can be expressed exactly as a BSpline of degree
//! NewDegree on the knots FlatKnots 2. the range of a(t)
//! is the same as the range of F(t)
//! Warning: it is
//! the caller's responsability to insure that conditions
//! 1. and 2. above are satisfied : no check whatsoever
//! is made in this method
//! Status will return 0 if OK else it will return the pivot index
//! of the matrix that was inverted to compute the multiplied
//! BSpline : the method used is interpolation at Schoenenberg
//! points of a(t)*F(t)
Standard_EXPORT static void FunctionMultiply (const BSplCLib_EvaluatorFunction& Function, const Standard_Integer BSplineDegree, const TColStd_Array1OfReal& BSplineFlatKnots, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer NewDegree, TColgp_Array1OfPnt& NewPoles, Standard_Integer& Status) ;
//! Perform the De Boor algorithm to evaluate a point at
//! parameter <U>, with <Degree> and <Dimension>.
//!
//! Poles is an array of Reals of size
//!
//! <Dimension> * <Degree>+1
//!
//! Containing the poles. At the end <Poles> contains
//! the current point. Poles Contain all the poles of
//! the BsplineCurve, Knots also Contains all the knots
//! of the BsplineCurve. ExtrapMode has two slots [0] =
//! Degree used to extrapolate before the first knot [1]
//! = Degre used to extrapolate after the last knot has
//! to be between 1 and Degree
Standard_EXPORT static void Eval (const Standard_Real U, const Standard_Boolean PeriodicFlag, const Standard_Integer DerivativeRequest, Standard_Integer& ExtrapMode, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer ArrayDimension, Standard_Real& Poles, Standard_Real& Result) ;
//! Perform the De Boor algorithm to evaluate a point at
//! parameter <U>, with <Degree> and <Dimension>.
//! Evaluates by multiplying the Poles by the Weights and
//! gives the homogeneous result in PolesResult that is
//! the results of the evaluation of the numerator once it
//! has been multiplied by the weights and in
//! WeightsResult one has the result of the evaluation of
//! the denominator
//!
//! Warning: <PolesResult> and <WeightsResult> must be dimensionned
//! properly.
Standard_EXPORT static void Eval (const Standard_Real U, const Standard_Boolean PeriodicFlag, const Standard_Integer DerivativeRequest, Standard_Integer& ExtrapMode, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer ArrayDimension, Standard_Real& Poles, Standard_Real& Weights, Standard_Real& PolesResult, Standard_Real& WeightsResult) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
Standard_EXPORT static void Eval (const Standard_Real U, const Standard_Boolean PeriodicFlag, const Standard_Boolean HomogeneousFlag, Standard_Integer& ExtrapMode, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, Standard_Real& Weight) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
Standard_EXPORT static void Eval (const Standard_Real U, const Standard_Boolean PeriodicFlag, const Standard_Boolean HomogeneousFlag, Standard_Integer& ExtrapMode, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, Standard_Real& Weight) ;
//! Extend a BSpline nD using the tangency map
//! <C1Coefficient> is the coefficient of reparametrisation
//! <Continuity> must be equal to 1, 2 or 3.
//! <Degree> must be greater or equal than <Continuity> + 1.
//!
//! Warning: <KnotsResult> and <PolesResult> must be dimensionned
//! properly.
Standard_EXPORT static void TangExtendToConstraint (const TColStd_Array1OfReal& FlatKnots, const Standard_Real C1Coefficient, const Standard_Integer NumPoles, Standard_Real& Poles, const Standard_Integer Dimension, const Standard_Integer Degree, const TColStd_Array1OfReal& ConstraintPoint, const Standard_Integer Continuity, const Standard_Boolean After, Standard_Integer& NbPolesResult, Standard_Integer& NbKnotsRsult, Standard_Real& KnotsResult, Standard_Real& PolesResult) ;
//! Perform the evaluation of the of the cache
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! this just evaluates the current point
//! the CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effects
Standard_EXPORT static void CacheD0 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! ththe CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effectsis just evaluates the current point
Standard_EXPORT static void CacheD0 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point) ;
//! Calls CacheD0 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD0 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point) ;
//! Calls CacheD0 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD0 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point) ;
//! Perform the evaluation of the of the cache
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! this just evaluates the current point
//! the CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effects
Standard_EXPORT static void CacheD1 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! ththe CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effectsis just evaluates the current point
Standard_EXPORT static void CacheD1 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD1 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD1 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec) ;
//! Perform the evaluation of the of the cache
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! this just evaluates the current point
//! the CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effects
Standard_EXPORT static void CacheD2 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec1, gp_Vec& Vec2) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! ththe CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effectsis just evaluates the current point
Standard_EXPORT static void CacheD2 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec1, gp_Vec2d& Vec2) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD2 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec1, gp_Vec& Vec2) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD2 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec1, gp_Vec2d& Vec2) ;
//! Perform the evaluation of the of the cache
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! this just evaluates the current point
//! the CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effects
Standard_EXPORT static void CacheD3 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec1, gp_Vec& Vec2, gp_Vec& Vec3) ;
//! Perform the evaluation of the Bspline Basis
//! and then multiplies by the weights
//! this just evaluates the current point
//! the parameter must be normalized between
//! the 0 and 1 for the span.
//! The Cache must be valid when calling this
//! routine. Geom Package will insure that.
//! and then multiplies by the weights
//! ththe CacheParameter is where the Cache was
//! constructed the SpanLength is to normalize
//! the polynomial in the cache to avoid bad conditioning
//! effectsis just evaluates the current point
Standard_EXPORT static void CacheD3 (const Standard_Real U, const Standard_Integer Degree, const Standard_Real CacheParameter, const Standard_Real SpanLenght, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec1, gp_Vec2d& Vec2, gp_Vec2d& Vec3) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD3 (const Standard_Real U, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt& Point, gp_Vec& Vec1, gp_Vec& Vec2, gp_Vec& Vec3) ;
//! Calls CacheD1 for Bezier Curves Arrays computed with
//! the method PolesCoefficients.
//! Warning: To be used for Beziercurves ONLY!!!
static void CoefsD3 (const Standard_Real U, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, gp_Pnt2d& Point, gp_Vec2d& Vec1, gp_Vec2d& Vec2, gp_Vec2d& Vec3) ;
//! Perform the evaluation of the Taylor expansion
//! of the Bspline normalized between 0 and 1.
//! If rational computes the homogeneous Taylor expension
//! for the numerator and stores it in CachePoles
Standard_EXPORT static void BuildCache (const Standard_Real U, const Standard_Real InverseOfSpanDomain, const Standard_Boolean PeriodicFlag, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt& CachePoles, TColStd_Array1OfReal& CacheWeights) ;
//! Perform the evaluation of the Taylor expansion
//! of the Bspline normalized between 0 and 1.
//! If rational computes the homogeneous Taylor expension
//! for the numerator and stores it in CachePoles
Standard_EXPORT static void BuildCache (const Standard_Real U, const Standard_Real InverseOfSpanDomain, const Standard_Boolean PeriodicFlag, const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt2d& CachePoles, TColStd_Array1OfReal& CacheWeights) ;
static void PolesCoefficients (const TColgp_Array1OfPnt2d& Poles, TColgp_Array1OfPnt2d& CachePoles) ;
Standard_EXPORT static void PolesCoefficients (const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt2d& CachePoles, TColStd_Array1OfReal& CacheWeights) ;
static void PolesCoefficients (const TColgp_Array1OfPnt& Poles, TColgp_Array1OfPnt& CachePoles) ;
//! Encapsulation of BuildCache to perform the
//! evaluation of the Taylor expansion for beziercurves
//! at parameter 0.
//! Warning: To be used for Beziercurves ONLY!!!
Standard_EXPORT static void PolesCoefficients (const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, TColgp_Array1OfPnt& CachePoles, TColStd_Array1OfReal& CacheWeights) ;
//! Returns pointer to statically allocated array representing
//! flat knots for bezier curve of the specified degree.
//! Raises OutOfRange if Degree > MaxDegree()
Standard_EXPORT static const Standard_Real& FlatBezierKnots (const Standard_Integer Degree) ;
//! builds the Schoenberg points from the flat knot
//! used to interpolate a BSpline since the
//! BSpline matrix is invertible.
Standard_EXPORT static void BuildSchoenbergPoints (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, TColStd_Array1OfReal& Parameters) ;
//! Performs the interpolation of the data given in
//! the Poles array according to the requests in
//! ContactOrderArray that is : if
//! ContactOrderArray(i) has value d it means that
//! Poles(i) containes the dth derivative of the
//! function to be interpolated. The length L of the
//! following arrays must be the same :
//! Parameters, ContactOrderArray, Poles,
//! The length of FlatKnots is Degree + L + 1
//! Warning:
//! the method used to do that interpolation is
//! gauss elimination WITHOUT pivoting. Thus if the
//! diagonal is not dominant there is no guarantee
//! that the algorithm will work. Nevertheless for
//! Cubic interpolation or interpolation at Scheonberg
//! points the method will work
//! The InversionProblem will report 0 if there was no
//! problem else it will give the index of the faulty
//! pivot
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, TColgp_Array1OfPnt& Poles, Standard_Integer& InversionProblem) ;
//! Performs the interpolation of the data given in
//! the Poles array according to the requests in
//! ContactOrderArray that is : if
//! ContactOrderArray(i) has value d it means that
//! Poles(i) containes the dth derivative of the
//! function to be interpolated. The length L of the
//! following arrays must be the same :
//! Parameters, ContactOrderArray, Poles,
//! The length of FlatKnots is Degree + L + 1
//! Warning:
//! the method used to do that interpolation is
//! gauss elimination WITHOUT pivoting. Thus if the
//! diagonal is not dominant there is no guarantee
//! that the algorithm will work. Nevertheless for
//! Cubic interpolation at knots or interpolation at Scheonberg
//! points the method will work.
//! The InversionProblem w
//! ll report 0 if there was no
//! problem else it will give the index of the faulty
//! pivot
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, TColgp_Array1OfPnt2d& Poles, Standard_Integer& InversionProblem) ;
//! Performs the interpolation of the data given in
//! the Poles array according to the requests in
//! ContactOrderArray that is : if
//! ContactOrderArray(i) has value d it means that
//! Poles(i) containes the dth derivative of the
//! function to be interpolated. The length L of the
//! following arrays must be the same :
//! Parameters, ContactOrderArray, Poles,
//! The length of FlatKnots is Degree + L + 1
//! Warning:
//! the method used to do that interpolation is
//! gauss elimination WITHOUT pivoting. Thus if the
//! diagonal is not dominant there is no guarantee
//! that the algorithm will work. Nevertheless for
//! Cubic interpolation at knots or interpolation at Scheonberg
//! points the method will work.
//! The InversionProblem will report 0 if there was no
//! problem else it will give the index of the faulty
//! pivot
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, TColgp_Array1OfPnt& Poles, TColStd_Array1OfReal& Weights, Standard_Integer& InversionProblem) ;
//! Performs the interpolation of the data given in
//! the Poles array according to the requests in
//! ContactOrderArray that is : if
//! ContactOrderArray(i) has value d it means that
//! Poles(i) containes the dth derivative of the
//! function to be interpolated. The length L of the
//! following arrays must be the same :
//! Parameters, ContactOrderArray, Poles,
//! The length of FlatKnots is Degree + L + 1
//! Warning:
//! the method used to do that interpolation is
//! gauss elimination WITHOUT pivoting. Thus if the
//! diagonal is not dominant there is no guarantee
//! that the algorithm will work. Nevertheless for
//! Cubic interpolation at knots or interpolation at Scheonberg
//! points the method will work.
//! The InversionProblem w
//! ll report 0 if there was no
//! problem else it will give the i
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, TColgp_Array1OfPnt2d& Poles, TColStd_Array1OfReal& Weights, Standard_Integer& InversionProblem) ;
//! Performs the interpolation of the data given in
//! the Poles array according to the requests in
//! ContactOrderArray that is : if
//! ContactOrderArray(i) has value d it means that
//! Poles(i) containes the dth derivative of the
//! function to be interpolated. The length L of the
//! following arrays must be the same :
//! Parameters, ContactOrderArray
//! The length of FlatKnots is Degree + L + 1
//! The PolesArray is an seen as an
//! Array[1..N][1..ArrayDimension] with N = tge length
//! of the parameters array
//! Warning:
//! the method used to do that interpolation is
//! gauss elimination WITHOUT pivoting. Thus if the
//! diagonal is not dominant there is no guarantee
//! that the algorithm will work. Nevertheless for
//! Cubic interpolation or interpolation at Scheonberg
//! points the method will work
//! The InversionProblem will report 0 if there was no
//! problem else it will give the index of the faulty
//! pivot
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, const Standard_Integer ArrayDimension, Standard_Real& Poles, Standard_Integer& InversionProblem) ;
Standard_EXPORT static void Interpolate (const Standard_Integer Degree, const TColStd_Array1OfReal& FlatKnots, const TColStd_Array1OfReal& Parameters, const TColStd_Array1OfInteger& ContactOrderArray, const Standard_Integer ArrayDimension, Standard_Real& Poles, Standard_Real& Weights, Standard_Integer& InversionProblem) ;
//! Find the new poles which allows an old point (with a
//! given u as parameter) to reach a new position
//! Index1 and Index2 indicate the range of poles we can move
//! (1, NbPoles-1) or (2, NbPoles) -> no constraint for one side
//! don't enter (1,NbPoles) -> error: rigid move
//! (2, NbPoles-1) -> the ends are enforced
//! (3, NbPoles-2) -> the ends and the tangency are enforced
//! if Problem in BSplineBasis calculation, no change for the curve
//! and FirstIndex, LastIndex = 0
Standard_EXPORT static void MovePoint (const Standard_Real U, const gp_Vec2d& Displ, const Standard_Integer Index1, const Standard_Integer Index2, const Standard_Integer Degree, const Standard_Boolean Rational, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, Standard_Integer& FirstIndex, Standard_Integer& LastIndex, TColgp_Array1OfPnt2d& NewPoles) ;
//! Find the new poles which allows an old point (with a
//! given u as parameter) to reach a new position
//! Index1 and Index2 indicate the range of poles we can move
//! (1, NbPoles-1) or (2, NbPoles) -> no constraint for one side
//! don't enter (1,NbPoles) -> error: rigid move
//! (2, NbPoles-1) -> the ends are enforced
//! (3, NbPoles-2) -> the ends and the tangency are enforced
//! if Problem in BSplineBasis calculation, no change for the curve
//! and FirstIndex, LastIndex = 0
Standard_EXPORT static void MovePoint (const Standard_Real U, const gp_Vec& Displ, const Standard_Integer Index1, const Standard_Integer Index2, const Standard_Integer Degree, const Standard_Boolean Rational, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, Standard_Integer& FirstIndex, Standard_Integer& LastIndex, TColgp_Array1OfPnt& NewPoles) ;
//! This is the dimension free version of the utility
//! U is the parameter must be within the first FlatKnots and the
//! last FlatKnots Delta is the amount the curve has to be moved
//! DeltaDerivative is the amount the derivative has to be moved.
//! Delta and DeltaDerivative must be array of dimension
//! ArrayDimension Degree is the degree of the BSpline and the
//! FlatKnots are the knots of the BSpline Starting Condition if =
//! -1 means the starting point of the curve can move
//! = 0 means the
//! starting point of the cuve cannot move but tangen starting
//! point of the curve cannot move
//! = 1 means the starting point and tangents cannot move
//! = 2 means the starting point tangent and curvature cannot move
//! = ...
//! Same holds for EndingCondition
//! Poles are the poles of the curve
//! Weights are the weights of the curve if Rational = Standard_True
//! NewPoles are the poles of the deformed curve
//! ErrorStatus will be 0 if no error happened
//! 1 if there are not enough knots/poles
//! the imposed conditions
//! The way to solve this problem is to add knots to the BSpline
//! If StartCondition = 1 and EndCondition = 1 then you need at least
//! 4 + 2 = 6 poles so for example to have a C1 cubic you will need
//! have at least 2 internal knots.
Standard_EXPORT static void MovePointAndTangent (const Standard_Real U, const Standard_Integer ArrayDimension, Standard_Real& Delta, Standard_Real& DeltaDerivative, const Standard_Real Tolerance, const Standard_Integer Degree, const Standard_Boolean Rational, const Standard_Integer StartingCondition, const Standard_Integer EndingCondition, Standard_Real& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, Standard_Real& NewPoles, Standard_Integer& ErrorStatus) ;
//! This is the dimension free version of the utility
//! U is the parameter must be within the first FlatKnots and the
//! last FlatKnots Delta is the amount the curve has to be moved
//! DeltaDerivative is the amount the derivative has to be moved.
//! Delta and DeltaDerivative must be array of dimension
//! ArrayDimension Degree is the degree of the BSpline and the
//! FlatKnots are the knots of the BSpline Starting Condition if =
//! -1 means the starting point of the curve can move
//! = 0 means the
//! starting point of the cuve cannot move but tangen starting
//! point of the curve cannot move
//! = 1 means the starting point and tangents cannot move
//! = 2 means the starting point tangent and curvature cannot move
//! = ...
//! Same holds for EndingCondition
//! Poles are the poles of the curve
//! Weights are the weights of the curve if Rational = Standard_True
//! NewPoles are the poles of the deformed curve
//! ErrorStatus will be 0 if no error happened
//! 1 if there are not enough knots/poles
//! the imposed conditions
//! The way to solve this problem is to add knots to the BSpline
//! If StartCondition = 1 and EndCondition = 1 then you need at least
//! 4 + 2 = 6 poles so for example to have a C1 cubic you will need
//! have at least 2 internal knots.
Standard_EXPORT static void MovePointAndTangent (const Standard_Real U, const gp_Vec& Delta, const gp_Vec& DeltaDerivative, const Standard_Real Tolerance, const Standard_Integer Degree, const Standard_Boolean Rational, const Standard_Integer StartingCondition, const Standard_Integer EndingCondition, const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, TColgp_Array1OfPnt& NewPoles, Standard_Integer& ErrorStatus) ;
//! This is the dimension free version of the utility
//! U is the parameter must be within the first FlatKnots and the
//! last FlatKnots Delta is the amount the curve has to be moved
//! DeltaDerivative is the amount the derivative has to be moved.
//! Delta and DeltaDerivative must be array of dimension
//! ArrayDimension Degree is the degree of the BSpline and the
//! FlatKnots are the knots of the BSpline Starting Condition if =
//! -1 means the starting point of the curve can move
//! = 0 means the
//! starting point of the cuve cannot move but tangen starting
//! point of the curve cannot move
//! = 1 means the starting point and tangents cannot move
//! = 2 means the starting point tangent and curvature cannot move
//! = ...
//! Same holds for EndingCondition
//! Poles are the poles of the curve
//! Weights are the weights of the curve if Rational = Standard_True
//! NewPoles are the poles of the deformed curve
//! ErrorStatus will be 0 if no error happened
//! 1 if there are not enough knots/poles
//! the imposed conditions
//! The way to solve this problem is to add knots to the BSpline
//! If StartCondition = 1 and EndCondition = 1 then you need at least
//! 4 + 2 = 6 poles so for example to have a C1 cubic you will need
//! have at least 2 internal knots.
Standard_EXPORT static void MovePointAndTangent (const Standard_Real U, const gp_Vec2d& Delta, const gp_Vec2d& DeltaDerivative, const Standard_Real Tolerance, const Standard_Integer Degree, const Standard_Boolean Rational, const Standard_Integer StartingCondition, const Standard_Integer EndingCondition, const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, TColgp_Array1OfPnt2d& NewPoles, Standard_Integer& ErrorStatus) ;
//! given a tolerance in 3D space returns a
//! tolerance in U parameter space such that
//! all u1 and u0 in the domain of the curve f(u)
//! | u1 - u0 | < UTolerance and
//! we have |f (u1) - f (u0)| < Tolerance3D
Standard_EXPORT static void Resolution (Standard_Real& PolesArray, const Standard_Integer ArrayDimension, const Standard_Integer NumPoles, const TColStd_Array1OfReal& Weights, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer Degree, const Standard_Real Tolerance3D, Standard_Real& UTolerance) ;
//! given a tolerance in 3D space returns a
//! tolerance in U parameter space such that
//! all u1 and u0 in the domain of the curve f(u)
//! | u1 - u0 | < UTolerance and
//! we have |f (u1) - f (u0)| < Tolerance3D
Standard_EXPORT static void Resolution (const TColgp_Array1OfPnt& Poles, const TColStd_Array1OfReal& Weights, const Standard_Integer NumPoles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer Degree, const Standard_Real Tolerance3D, Standard_Real& UTolerance) ;
//! given a tolerance in 3D space returns a
//! tolerance in U parameter space such that
//! all u1 and u0 in the domain of the curve f(u)
//! | u1 - u0 | < UTolerance and
//! we have |f (u1) - f (u0)| < Tolerance3D
Standard_EXPORT static void Resolution (const TColgp_Array1OfPnt2d& Poles, const TColStd_Array1OfReal& Weights, const Standard_Integer NumPoles, const TColStd_Array1OfReal& FlatKnots, const Standard_Integer Degree, const Standard_Real Tolerance3D, Standard_Real& UTolerance) ;
protected:
private:
Standard_EXPORT static void LocateParameter (const TColStd_Array1OfReal& Knots, const Standard_Real U, const Standard_Boolean Periodic, const Standard_Integer K1, const Standard_Integer K2, Standard_Integer& Index, Standard_Real& NewU, const Standard_Real Uf, const Standard_Real Ue) ;
};
#include <BSplCLib.lxx>
#endif // _BSplCLib_HeaderFile
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