/usr/share/doc/libplplot12/examples/c/x21c.c is in libplplot-dev 5.10.0+dfsg-1.
This file is owned by root:root, with mode 0o644.
The actual contents of the file can be viewed below.
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// Grid data demo
//
// Copyright (C) 2004 Joao Cardoso
//
// This file is part of PLplot.
//
// PLplot is free software; you can redistribute it and/or modify
// it under the terms of the GNU Library General Public License as published
// by the Free Software Foundation; either version 2 of the License, or
// (at your option) any later version.
//
// PLplot is distributed in the hope that it will be useful,
// but WITHOUT ANY WARRANTY; without even the implied warranty of
// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
// GNU Library General Public License for more details.
//
// You should have received a copy of the GNU Library General Public License
// along with PLplot; if not, write to the Free Software
// Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
//
//
#include "plcdemos.h"
// Options data structure definition.
static PLINT pts = 500;
static PLINT xp = 25;
static PLINT yp = 20;
static PLINT nl = 16;
static int knn_order = 20;
static PLFLT threshold = 1.001;
static PLFLT wmin = -1e3;
static int randn = 0;
static int rosen = 0;
static PLOptionTable options[] = {
{
"npts",
NULL,
NULL,
&pts,
PL_OPT_INT,
"-npts points",
"Specify number of random points to generate [500]"
},
{
"randn",
NULL,
NULL,
&randn,
PL_OPT_BOOL,
"-randn",
"Normal instead of uniform sampling -- the effective \n\
\t\t\t number of points will be smaller than the specified."
},
{
"rosen",
NULL,
NULL,
&rosen,
PL_OPT_BOOL,
"-rosen",
"Generate points from the Rosenbrock function."
},
{
"nx",
NULL,
NULL,
&xp,
PL_OPT_INT,
"-nx points",
"Specify grid x dimension [25]"
},
{
"ny",
NULL,
NULL,
&yp,
PL_OPT_INT,
"-ny points",
"Specify grid y dimension [20]"
},
{
"nlevel",
NULL,
NULL,
&nl,
PL_OPT_INT,
"-nlevel ",
"Specify number of contour levels [15]"
},
{
"knn_order",
NULL,
NULL,
&knn_order,
PL_OPT_INT,
"-knn_order order",
"Specify the number of neighbors [20]"
},
{
"threshold",
NULL,
NULL,
&threshold,
PL_OPT_FLOAT,
"-threshold float",
"Specify what a thin triangle is [1. < [1.001] < 2.]"
},
{
NULL, // option
NULL, // handler
NULL, // client data
NULL, // address of variable to set
0, // mode flag
NULL, // short syntax
NULL
} // long syntax
};
void create_data( PLFLT **xi, PLFLT **yi, PLFLT **zi, int npts );
void free_data( PLFLT *x, PLFLT *y, PLFLT *z );
void create_grid( PLFLT **xi, int px, PLFLT **yi, int py );
void free_grid( PLFLT *x, PLFLT *y );
static void
cmap1_init( void )
{
PLFLT i[2], h[2], l[2], s[2];
i[0] = 0.0; // left boundary
i[1] = 1.0; // right boundary
h[0] = 240; // blue -> green -> yellow ->
h[1] = 0; // -> red
l[0] = 0.6;
l[1] = 0.6;
s[0] = 0.8;
s[1] = 0.8;
plscmap1n( 256 );
c_plscmap1l( 0, 2, i, h, l, s, NULL );
}
PLFLT xm, xM, ym, yM;
int
main( int argc, const char *argv[] )
{
PLFLT *x, *y, *z, *clev;
PLFLT *xg, *yg, **zg;
PLFLT zmin, zmax, lzm, lzM;
int i, j, k;
PLINT alg;
const char *title[] = { "Cubic Spline Approximation",
"Delaunay Linear Interpolation",
"Natural Neighbors Interpolation",
"KNN Inv. Distance Weighted",
"3NN Linear Interpolation",
"4NN Around Inv. Dist. Weighted" };
PLFLT opt[] = { 0., 0., 0., 0., 0., 0. };
xm = ym = -0.2;
xM = yM = 0.6;
plMergeOpts( options, "x21c options", NULL );
plparseopts( &argc, argv, PL_PARSE_FULL );
opt[2] = wmin;
opt[3] = (PLFLT) knn_order;
opt[4] = threshold;
// Initialize plplot
plinit();
// Use a colour map with no black band in the middle.
cmap1_init();
// Initialise random number generator
plseed( 5489 );
create_data( &x, &y, &z, pts ); // the sampled data
zmin = z[0];
zmax = z[0];
for ( i = 1; i < pts; i++ )
{
if ( z[i] > zmax )
zmax = z[i];
if ( z[i] < zmin )
zmin = z[i];
}
create_grid( &xg, xp, &yg, yp ); // grid the data at
plAlloc2dGrid( &zg, xp, yp ); // the output grided data
clev = (PLFLT *) malloc( (size_t) nl * sizeof ( PLFLT ) );
plcol0( 1 );
plenv( xm, xM, ym, yM, 2, 0 );
plcol0( 15 );
pllab( "X", "Y", "The original data sampling" );
for ( i = 0; i < pts; i++ )
{
plcol1( ( z[i] - zmin ) / ( zmax - zmin ) );
// The following plstring call should be the the equivalent of
// plpoin( 1, &x[i], &y[i], 5 ); Use plstring because it is
// not deprecated like plpoin and has much more powerful
// capabilities. N.B. symbol 141 works for Hershey devices
// (e.g., -dev xwin) only if plfontld( 0 ) has been called
// while symbol 727 works only if plfontld( 1 ) has been
// called. The latter is the default which is why we use 727
// here to represent a centred X (multiplication) symbol.
// This dependence on plfontld is one of the limitations of
// the Hershey escapes for PLplot, but the upside is you get
// reasonable results for both Hershey and Unicode devices.
plstring( 1, &x[i], &y[i], "#(727)" );
}
pladv( 0 );
plssub( 3, 2 );
for ( k = 0; k < 2; k++ )
{
pladv( 0 );
for ( alg = 1; alg < 7; alg++ )
{
plgriddata( x, y, z, pts, xg, xp, yg, yp, zg, alg, opt[alg - 1] );
// - CSA can generate NaNs (only interpolates?!).
// - DTLI and NNI can generate NaNs for points outside the convex hull
// of the data points.
// - NNLI can generate NaNs if a sufficiently thick triangle is not found
//
// PLplot should be NaN/Inf aware, but changing it now is quite a job...
// so, instead of not plotting the NaN regions, a weighted average over
// the neighbors is done.
//
if ( alg == GRID_CSA || alg == GRID_DTLI || alg == GRID_NNLI || alg == GRID_NNI )
{
int ii, jj;
PLFLT dist, d;
for ( i = 0; i < xp; i++ )
{
for ( j = 0; j < yp; j++ )
{
if ( isnan( zg[i][j] ) ) // average (IDW) over the 8 neighbors
{
zg[i][j] = 0.; dist = 0.;
for ( ii = i - 1; ii <= i + 1 && ii < xp; ii++ )
{
for ( jj = j - 1; jj <= j + 1 && jj < yp; jj++ )
{
if ( ii >= 0 && jj >= 0 && !isnan( zg[ii][jj] ) )
{
d = ( abs( ii - i ) + abs( jj - j ) ) == 1 ? 1. : 1.4142;
zg[i][j] += zg[ii][jj] / ( d * d );
dist += d;
}
}
}
if ( dist != 0. )
zg[i][j] /= dist;
else
zg[i][j] = zmin;
}
}
}
}
plMinMax2dGrid( (const PLFLT * const *) zg, xp, yp, &lzM, &lzm );
lzm = MIN( lzm, zmin );
lzM = MAX( lzM, zmax );
// Increase limits slightly to prevent spurious contours
// due to rounding errors
lzm = lzm - 0.01;
lzM = lzM + 0.01;
plcol0( 1 );
pladv( alg );
if ( k == 0 )
{
for ( i = 0; i < nl; i++ )
clev[i] = lzm + ( lzM - lzm ) / ( nl - 1 ) * i;
plenv0( xm, xM, ym, yM, 2, 0 );
plcol0( 15 );
pllab( "X", "Y", title[alg - 1] );
plshades( (const PLFLT * const *) zg, xp, yp, NULL, xm, xM, ym, yM,
clev, nl, 1., 0, 1., plfill, 1, NULL, NULL );
plcol0( 2 );
}
else
{
for ( i = 0; i < nl; i++ )
clev[i] = lzm + ( lzM - lzm ) / ( nl - 1 ) * i;
plvpor( 0.0, 1.0, 0.0, 0.9 );
plwind( -1.1, 0.75, -0.65, 1.20 );
//
// For the comparison to be fair, all plots should have the
// same z values, but to get the max/min of the data generated
// by all algorithms would imply two passes. Keep it simple.
//
// plw3d(1., 1., 1., xm, xM, ym, yM, zmin, zmax, 30, -60);
//
plw3d( 1., 1., 1., xm, xM, ym, yM, lzm, lzM, 30, -40 );
plbox3( "bntu", "X", 0., 0,
"bntu", "Y", 0., 0,
"bcdfntu", "Z", 0.5, 0 );
plcol0( 15 );
pllab( "", "", title[alg - 1] );
plot3dc( xg, yg, (const PLFLT * const *) zg, xp, yp, DRAW_LINEXY | MAG_COLOR | BASE_CONT, clev, nl );
}
}
}
plend();
free_data( x, y, z );
free_grid( xg, yg );
free( (void *) clev );
plFree2dGrid( zg, xp, yp );
exit( 0 );
}
void
create_grid( PLFLT **xi, int px, PLFLT **yi, int py )
{
PLFLT *x, *y;
int i;
x = *xi = (PLFLT *) malloc( (size_t) px * sizeof ( PLFLT ) );
y = *yi = (PLFLT *) malloc( (size_t) py * sizeof ( PLFLT ) );
for ( i = 0; i < px; i++ )
*x++ = xm + ( xM - xm ) * i / ( px - 1. );
for ( i = 0; i < py; i++ )
*y++ = ym + ( yM - ym ) * i / ( py - 1. );
}
void
free_grid( PLFLT *xi, PLFLT *yi )
{
free( (void *) xi );
free( (void *) yi );
}
void
create_data( PLFLT **xi, PLFLT **yi, PLFLT **zi, int npts )
{
int i;
PLFLT *x, *y, *z, r;
PLFLT xt, yt;
*xi = x = (PLFLT *) malloc( (size_t) npts * sizeof ( PLFLT ) );
*yi = y = (PLFLT *) malloc( (size_t) npts * sizeof ( PLFLT ) );
*zi = z = (PLFLT *) malloc( (size_t) npts * sizeof ( PLFLT ) );
for ( i = 0; i < npts; i++ )
{
xt = ( xM - xm ) * plrandd();
yt = ( yM - ym ) * plrandd();
if ( !randn )
{
*x = xt + xm;
*y = yt + ym;
}
else // std=1, meaning that many points are outside the plot range
{
*x = sqrt( -2. * log( xt ) ) * cos( 2. * M_PI * yt ) + xm;
*y = sqrt( -2. * log( xt ) ) * sin( 2. * M_PI * yt ) + ym;
}
if ( !rosen )
{
r = sqrt( ( *x ) * ( *x ) + ( *y ) * ( *y ) );
*z = exp( -r * r ) * cos( 2.0 * M_PI * r );
}
else
{
*z = log( pow( 1. - *x, 2. ) + 100. * pow( *y - pow( *x, 2. ), 2. ) );
}
x++; y++; z++;
}
}
void
free_data( PLFLT *x, PLFLT *y, PLFLT *z )
{
free( (void *) x );
free( (void *) y );
free( (void *) z );
}
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