/usr/share/hol88-2.02.19940316/Library/arith/solve.ml is in hol88-library-source 2.02.19940316-35.
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% FILE : solve.ml %
% DESCRIPTION : Functions for solving arithmetic formulae. %
% %
% READS FILES : <none> %
% WRITES FILES : <none> %
% %
% AUTHOR : R.J.Boulton %
% DATE : 19th April 1991 %
% %
% LAST MODIFIED : R.J.Boulton %
% DATE : 2nd July 1992 %
%****************************************************************************%
%----------------------------------------------------------------------------%
% INEQS_FALSE_CONV : conv %
% %
% Proves a conjunction of normalized inequalities is false, provided they %
% are unsatisfiable. Checks for any inequalities that can immediately be %
% shown to be false before calling VAR_ELIM. %
% %
% Example: %
% %
% INEQS_FALSE_CONV %
% "((2 + (2 * n)) <= (1 * m)) /\ %
% ((1 * m) <= (1 * n)) /\ %
% (0 <= (1 * n)) /\ %
% (0 <= (1 * m))" %
% ---> %
% |- (2 + (2 * n)) <= (1 * m) /\ %
% (1 * m) <= (1 * n) /\ %
% 0 <= (1 * n) /\ %
% 0 <= (1 * m) = %
% F %
%----------------------------------------------------------------------------%
let INEQS_FALSE_CONV tm =
(let ineqs = conjuncts tm
in let coeffsl = map coeffs_of_leq ineqs
in let falses = filter (\(const,bind). (null bind) & (const < 0)) coeffsl
in let th =
if (null falses)
then let var_names = setify (map fst (flat (map snd coeffsl)))
in let coeffsl' = (map (\v. (0, [(v,1)])) var_names) @ coeffsl
in let (_,f) = VAR_ELIM coeffsl'
in let axioms =
map (\v. SPEC (mk_num_var v) ZERO_LESS_EQ_ONE_TIMES)
var_names
in itlist PROVE_HYP axioms (f ())
else ASSUME (build_leq (hd falses))
in let th' = CONV_RULE LEQ_CONV th
in let th'' = DISCH (last ineqs) th'
in let conj_disch tm th = CONV_RULE IMP_IMP_CONJ_IMP_CONV (DISCH tm th)
in let th''' = itlist conj_disch (butlast ineqs) th''
in CONV_RULE IMP_F_EQ_F_CONV th'''
) ? failwith `INEQS_FALSE_CONV`;;
%----------------------------------------------------------------------------%
% DISJ_INEQS_FALSE_QCONV : conv %
% %
% Proves a disjunction of conjunctions of normalized inequalities is false, %
% provided each conjunction is unsatisfiable. %
%----------------------------------------------------------------------------%
letrec DISJ_INEQS_FALSE_QCONV tm =
(if (is_disj tm)
then ((RATOR_QCONV (RAND_QCONV INEQS_FALSE_CONV)) THENQC
OR_F_CONV THENQC
DISJ_INEQS_FALSE_QCONV) tm
else INEQS_FALSE_CONV tm
) ?\s qfailwith s `DISJ_INEQS_FALSE_QCONV`;;
%----------------------------------------------------------------------------%
% NOT_NOT_INTRO_CONV : conv %
% %
% "b" ---> |- b = ~~b provided b is of type ":bool". %
%----------------------------------------------------------------------------%
let NOT_NOT_INTRO_CONV tm =
(SYM ((NOT_NOT_NORM_CONV o mk_neg o mk_neg) tm)
) ? failwith `NOT_NOT_INTRO_CONV`;;
%----------------------------------------------------------------------------%
% Discriminator functions for T (true) and F (false) %
%----------------------------------------------------------------------------%
let is_T = let T = "T" in \tm. tm = T
and is_F = let F = "F" in \tm. tm = F;;
%----------------------------------------------------------------------------%
% NEGATE_CONV : conv -> conv %
% %
% Function for negating the operation of a conversion that proves a formula %
% to be either true or false. For example if `conv' proves "0 <= n" to be %
% equal to "T" then `NEGATE_CONV conv' will prove "~(0 <= n)" to be "F". %
% The function fails if the application of `conv' to the negation of the %
% formula does not yield either "T" or "F". %
% %
% If use of this function succeeds then the input term will necessarily have %
% been changed. Hence it does not need to be a QCONV. It can however take a %
% QCONV as its argument. %
%----------------------------------------------------------------------------%
let NEGATE_CONV qconv tm =
let neg = is_neg tm
in let th = QCONV qconv (if neg then (dest_neg tm) else (mk_neg tm))
in let r = rhs (concl th)
in let truth_th =
if (is_T r) then NOT_T_F
if (is_F r) then NOT_F_T
else failwith `NEGATE_CONV`
in let neg_fn = if neg then I else TRANS (NOT_NOT_INTRO_CONV tm)
in neg_fn (TRANS (AP_TERM "$~" th) truth_th);;
%----------------------------------------------------------------------------%
% DEPTH_FORALL_QCONV : conv -> conv %
% %
% DEPTH_FORALL_QCONV conv "!x1 ... xn. body" applies conv to "body" and %
% returns a theorem of the form: %
% %
% |- (!x1 ... xn. body) = (!x1 ... xn. body') %
%----------------------------------------------------------------------------%
letrec DEPTH_FORALL_QCONV conv tm =
if (is_forall tm)
then RAND_QCONV (ABS_QCONV (DEPTH_FORALL_QCONV conv)) tm
else conv tm;;
%----------------------------------------------------------------------------%
% FORALL_ARITH_CONV : conv %
% %
% Proof procedure for non-existential Presburger natural arithmetic %
% (+, * by a constant, numeric constants, numeric variables, <, <=, =, >=, > %
% ~, /\, \/, ==>, = (iff), ! (when in prenex normal form). %
% Expects formula in prenex normal form. %
% Subtraction and conditionals must have been eliminated. %
% SUC is allowed. %
% Boolean variables and constants are not allowed. %
% %
% The procedure will prove most formulae in the subset of arithmetic %
% specified above, but there is some incompleteness. However, this rarely %
% manifests itself in practice. It is therefore likely that if the procedure %
% cannot prove a formula in the subset, the formula is not valid. %
%----------------------------------------------------------------------------%
let FORALL_ARITH_CONV tm =
reset_multiplication_theorems ();
QCONV
(DEPTH_FORALL_QCONV
(NEGATE_CONV
((\tm. ARITH_FORM_NORM_QCONV tm ?\s qfailwith s
`FORALL_ARITH_CONV -- formula not in the allowed subset`) THENQC
(\tm. DISJ_INEQS_FALSE_QCONV tm ?\s qfailwith s
`FORALL_ARITH_CONV -- cannot prove formula`))) THENQC
REPEATQC FORALL_SIMP_CONV)
tm;;
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