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|
(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
(*
Tactic nsatz: proofs of polynomials equalities with variables in R.
Uses Hilbert Nullstellensatz and Buchberger algorithm.
Thanks to B.Gregoire for the verification of the certicate
and L.Thery for help on ring tactic,
and to B.Barras for modularization of the ocaml code.
Example: see test-suite/success/Nsatz.v
L.Pottier, june 2010
*)
Require Import List.
Require Import Setoid.
Require Import BinPos.
Require Import BinList.
Require Import Znumtheory.
Require Import Ring_polynom Ring_tac InitialRing.
Declare ML Module "nsatz_plugin".
Class Zero (A : Type) := {zero : A}.
Notation "0" := zero.
Class One (A : Type) := {one : A}.
Notation "1" := one.
Class Addition (A : Type) := {addition : A -> A -> A}.
Notation "x + y" := (addition x y).
Class Multiplication (A : Type) := {multiplication : A -> A -> A}.
Notation "x * y" := (multiplication x y).
Class Subtraction (A : Type) := {subtraction : A -> A -> A}.
Notation "x - y" := (subtraction x y).
Class Opposite (A : Type) := {opposite : A -> A}.
Notation "- x" := (opposite x).
Class Ring (R:Type) := {
ring0: R; ring1: R;
ring_plus: R->R->R; ring_mult: R->R->R;
ring_sub: R->R->R; ring_opp: R->R;
ring_ring:
ring_theory ring0 ring1 ring_plus ring_mult ring_sub
ring_opp (@eq R)}.
Class Domain (R : Type) := {
domain_ring:> Ring R;
domain_axiom_product:
forall x y, ring_mult x y = ring0 -> x = ring0 \/ y = ring0;
domain_axiom_one_zero: ring1 <> ring0}.
Ltac ring2 := simpl; ring.
Section domain.
Variable R: Type.
Variable Rd: Domain R.
Add Ring Rr: (@ring_ring R (@domain_ring R Rd)).
Instance zero_ring : Zero R := {zero := ring0}.
Instance one_ring : One R := {one := ring1}.
Instance addition_ring : Addition R := {addition x y := ring_plus x y}.
Instance multiplication_ring : Multiplication R := {multiplication x y := ring_mult x y}.
Instance subtraction_ring : Subtraction R := {subtraction x y := ring_sub x y}.
Instance opposite_ring : Opposite R := {opposite x := ring_opp x}.
Lemma psos_r1b: forall x y:R, x - y = 0 -> x = y.
intros x y H; replace x with ((x - y) + y);
[rewrite H | idtac]; ring2.
Qed.
Lemma psos_r1: forall x y, x = y -> x - y = 0.
intros x y H; rewrite H; ring2.
Qed.
Lemma nsatzR_diff: forall x y:R, x<>y -> x - y<>0.
intros.
intro; apply H.
replace x with ((x - y) + y) by ring2.
rewrite H0; ring2.
Qed.
(* code de Benjamin *)
Require Import ZArith.
Definition PolZ := Pol Z.
Definition PEZ := PExpr Z.
Definition P0Z : PolZ := @P0 Z 0%Z.
Definition PolZadd : PolZ -> PolZ -> PolZ :=
@Padd Z 0%Z Zplus Zeq_bool.
Definition PolZmul : PolZ -> PolZ -> PolZ :=
@Pmul Z 0%Z 1%Z Zplus Zmult Zeq_bool.
Definition PolZeq := @Peq Z Zeq_bool.
Definition norm :=
@norm_aux Z 0%Z 1%Z Zplus Zmult Zminus Zopp Zeq_bool.
Fixpoint mult_l (la : list PEZ) (lp: list PolZ) : PolZ :=
match la, lp with
| a::la, p::lp => PolZadd (PolZmul (norm a) p) (mult_l la lp)
| _, _ => P0Z
end.
Fixpoint compute_list (lla: list (list PEZ)) (lp:list PolZ) :=
match lla with
| List.nil => lp
| la::lla => compute_list lla ((mult_l la lp)::lp)
end.
Definition check (lpe:list PEZ) (qe:PEZ) (certif: list (list PEZ) * list PEZ) :=
let (lla, lq) := certif in
let lp := List.map norm lpe in
PolZeq (norm qe) (mult_l lq (compute_list lla lp)).
(* Correction *)
Definition PhiR : list R -> PolZ -> R :=
(Pphi 0 ring_plus ring_mult (gen_phiZ 0 1 ring_plus ring_mult ring_opp)).
Definition pow (r : R) (n : nat) := pow_N 1 ring_mult r (Nnat.N_of_nat n).
Definition PEevalR : list R -> PEZ -> R :=
PEeval 0 ring_plus ring_mult ring_sub ring_opp
(gen_phiZ 0 1 ring_plus ring_mult ring_opp)
Nnat.nat_of_N pow.
Lemma P0Z_correct : forall l, PhiR l P0Z = 0.
Proof. trivial. Qed.
Lemma Rext: ring_eq_ext ring_plus ring_mult ring_opp eq.
apply mk_reqe. intros. rewrite H; rewrite H0; trivial.
intros. rewrite H; rewrite H0; trivial.
intros. rewrite H; trivial. Qed.
Lemma Rset : Setoid_Theory R eq.
apply Eqsth.
Qed.
Lemma PolZadd_correct : forall P' P l,
PhiR l (PolZadd P P') = ((PhiR l P) + (PhiR l P')).
Proof.
refine (Padd_ok Rset Rext (Rth_ARth Rset Rext (@ring_ring _ (@domain_ring _ Rd)))
(gen_phiZ_morph Rset Rext (@ring_ring _ (@domain_ring _ Rd)))).
Qed.
Lemma PolZmul_correct : forall P P' l,
PhiR l (PolZmul P P') = ((PhiR l P) * (PhiR l P')).
Proof.
refine (Pmul_ok Rset Rext (Rth_ARth Rset Rext (@ring_ring _ (@domain_ring _ Rd)))
(gen_phiZ_morph Rset Rext (@ring_ring _ (@domain_ring _ Rd)))).
Qed.
Lemma R_power_theory
: power_theory 1 ring_mult eq Nnat.nat_of_N pow.
apply mkpow_th. unfold pow. intros. rewrite Nnat.N_of_nat_of_N. trivial. Qed.
Lemma norm_correct :
forall (l : list R) (pe : PEZ), PEevalR l pe = PhiR l (norm pe).
Proof.
intros;apply (norm_aux_spec Rset Rext (Rth_ARth Rset Rext (@ring_ring _ (@domain_ring _ Rd)))
(gen_phiZ_morph Rset Rext (@ring_ring _ (@domain_ring _ Rd))) R_power_theory)
with (lmp:= List.nil).
compute;trivial.
Qed.
Lemma PolZeq_correct : forall P P' l,
PolZeq P P' = true ->
PhiR l P = PhiR l P'.
Proof.
intros;apply
(Peq_ok Rset Rext (gen_phiZ_morph Rset Rext (@ring_ring _ (@domain_ring _ Rd))));trivial.
Qed.
Fixpoint Cond0 (A:Type) (Interp:A->R) (l:list A) : Prop :=
match l with
| List.nil => True
| a::l => Interp a = 0 /\ Cond0 A Interp l
end.
Lemma mult_l_correct : forall l la lp,
Cond0 PolZ (PhiR l) lp ->
PhiR l (mult_l la lp) = 0.
Proof.
induction la;simpl;intros;trivial.
destruct lp;trivial.
simpl in H;destruct H.
rewrite PolZadd_correct, PolZmul_correct, H, IHla;[ring2 | trivial].
Qed.
Lemma compute_list_correct : forall l lla lp,
Cond0 PolZ (PhiR l) lp ->
Cond0 PolZ (PhiR l) (compute_list lla lp).
Proof.
induction lla;simpl;intros;trivial.
apply IHlla;simpl;split;trivial.
apply mult_l_correct;trivial.
Qed.
Lemma check_correct :
forall l lpe qe certif,
check lpe qe certif = true ->
Cond0 PEZ (PEevalR l) lpe ->
PEevalR l qe = 0.
Proof.
unfold check;intros l lpe qe (lla, lq) H2 H1.
apply PolZeq_correct with (l:=l) in H2.
rewrite norm_correct, H2.
apply mult_l_correct.
apply compute_list_correct.
clear H2 lq lla qe;induction lpe;simpl;trivial.
simpl in H1;destruct H1.
rewrite <- norm_correct;auto.
Qed.
(* fin du code de Benjamin *)
Lemma pow_not_zero: forall p n, pow p n = 0 -> p = 0.
induction n. unfold pow; simpl. intros. absurd (1 = 0).
simpl. apply domain_axiom_one_zero.
trivial. replace (pow p (S n)) with (p * (pow p n)). intros.
case (@domain_axiom_product _ _ _ _ H). trivial. trivial.
unfold pow; simpl.
clear IHn. induction n; try ring2. simpl.
rewrite pow_pos_Psucc. trivial. exact Rset.
intros. rewrite H; rewrite H0; trivial.
intros. ring2. intros. ring2. Qed.
Lemma Rdomain_pow: forall c p r, ~c= 0 -> c * (pow p r)= 0 -> p = ring0.
intros. case (@domain_axiom_product _ _ _ _ H0). intros; absurd (c = 0); auto.
intros. apply pow_not_zero with r. trivial. Qed.
Definition R2:= 1 + 1.
Fixpoint IPR p {struct p}: R :=
match p with
xH => 1
| xO xH => 1 + 1
| xO p1 => R2 + (IPR p1)
| xI xH => 1 + (1 + 1)
| xI p1 => 1 + (R2 * (IPR p1))
end.
Definition IZR1 z :=
match z with Z0 => 0
| Zpos p => IPR p
| Zneg p => -(IPR p)
end.
Fixpoint interpret3 t fv {struct t}: R :=
match t with
| (PEadd t1 t2) =>
let v1 := interpret3 t1 fv in
let v2 := interpret3 t2 fv in (v1 + v2)
| (PEmul t1 t2) =>
let v1 := interpret3 t1 fv in
let v2 := interpret3 t2 fv in (v1 * v2)
| (PEsub t1 t2) =>
let v1 := interpret3 t1 fv in
let v2 := interpret3 t2 fv in (v1 - v2)
| (PEopp t1) =>
let v1 := interpret3 t1 fv in (- v1)
| (PEpow t1 t2) =>
let v1 := interpret3 t1 fv in pow v1 (Nnat.nat_of_N t2)
| (PEc t1) => (IZR1 t1)
| (PEX n) => List.nth (pred (nat_of_P n)) fv 0
end.
End domain.
Ltac equalities_to_goal :=
lazymatch goal with
| H: (@eq _ ?x 0) |- _ => try revert H
| H: (@eq _ 0 ?x) |- _ =>
try generalize (sym_equal H); clear H
| H: (@eq _ ?x ?y) |- _ =>
try generalize (@psos_r1 _ _ _ _ H); clear H
end.
Ltac nsatz_domain_begin tacsimpl:=
intros;
try apply (@psos_r1b _ _);
repeat equalities_to_goal;
tacsimpl.
Ltac generalise_eq_hyps:=
repeat
(match goal with
|h : (?p = ?q)|- _ => revert h
end).
Ltac lpol_goal t :=
match t with
| ?a = ring0 -> ?b =>
let r:= lpol_goal b in
constr:(a::r)
| ?a = ring0 => constr:(a::nil)
end.
(* lp est incluse dans fv. La met en tete. *)
Ltac parametres_en_tete fv lp :=
match fv with
| (@nil _) => lp
| (@cons _ ?x ?fv1) =>
let res := AddFvTail x lp in
parametres_en_tete fv1 res
end.
Ltac append1 a l :=
match l with
| (@nil _) => constr:(cons a l)
| (cons ?x ?l) => let l' := append1 a l in constr:(cons x l')
end.
Ltac rev l :=
match l with
|(@nil _) => l
| (cons ?x ?l) => let l' := rev l in append1 x l'
end.
Ltac nsatz_call_n info nparam p rr lp kont :=
let ll := constr:(PEc info :: PEc nparam :: PEpow p rr :: lp) in
nsatz_compute ll;
match goal with
| |- (?c::PEpow _ ?r::?lq0)::?lci0 = _ -> _ =>
intros _;
set (lci:=lci0);
set (lq:=lq0);
kont c rr lq lci
end.
Ltac nsatz_call radicalmax info nparam p lp kont :=
let rec try_n n :=
lazymatch n with
| 0%N => fail
| _ =>
(* idtac "Trying power: " n;*)
(let r := eval compute in (Nminus radicalmax (Npred n)) in
nsatz_call_n info nparam p r lp kont) ||
let n' := eval compute in (Npred n) in try_n n'
end in
try_n radicalmax.
Set Implicit Arguments.
Class Cclosed_seq T (l:list T) := {}.
Instance Iclosed_nil T : Cclosed_seq (T:=T) nil.
Instance Iclosed_cons T t l `{Cclosed_seq (T:=T) l} : Cclosed_seq (T:=T) (t::l).
Class Cfind_at (R:Type) (b:R) (l:list R) (i:nat) := {}.
Instance Ifind0 (R:Type) (b:R) l: Cfind_at b (b::l) 0.
Instance IfindS (R:Type) (b2 b1:R) l i `{Cfind_at R b1 l i} : Cfind_at b1 (b2::l) (S i) | 1.
Definition Ifind0' := Ifind0.
Definition IfindS' := IfindS.
Definition li_find_at (R:Type) (b:R) l i `{Cfind_at R b l i} {H:Cclosed_seq (T:=R) l} := (l,i).
Class Creify (R:Type) (e:PExpr Z) (l:list R) (b:R) := {}.
Instance Ireify_zero (R:Type) (Rd:Domain R) l : Creify (PEc 0%Z) l ring0.
Instance Ireify_one (R:Type) (Rd:Domain R) l : Creify (PEc 1%Z) l ring1.
Instance Ireify_plus (R:Type) (Rd:Domain R) e1 l b1 e2 b2 `{Creify R e1 l b1} `{Creify R e2 l b2}
: Creify (PEadd e1 e2) l (ring_plus b1 b2).
Instance Ireify_mult (R:Type) (Rd:Domain R) e1 l b1 e2 b2 `{Creify R e1 l b1} `{Creify R e2 l b2}
: Creify (PEmul e1 e2) l (ring_mult b1 b2).
Instance Ireify_sub (R:Type) (Rd:Domain R) e1 l b1 e2 b2 `{Creify R e1 l b1} `{Creify R e2 l b2}
: Creify (PEsub e1 e2) l (ring_sub b1 b2).
Instance Ireify_opp (R:Type) (Rd:Domain R) e1 l b1 `{Creify R e1 l b1}
: Creify (PEopp e1) l (ring_opp b1).
Instance Ireify_var (R:Type) b l i `{Cfind_at R b l i}
: Creify (PEX _ (P_of_succ_nat i)) l b | 100.
Class Creifylist (R:Type) (le:list (PExpr Z)) (l:list R) (lb:list R) := {}.
Instance Creify_nil (R:Type) l : Creifylist nil l (@nil R).
Instance Creify_cons (R:Type) e1 l b1 le2 lb2 `{Creify R e1 l b1} `{Creifylist R le2 l lb2}
: Creifylist (e1::le2) l (b1::lb2).
Definition li_reifyl (R:Type) le l lb `{Creifylist R le l lb}
{H:Cclosed_seq (T:=R) l} := (l,le).
Unset Implicit Arguments.
Ltac lterm_goal g :=
match g with
?b1 = ?b2 => constr:(b1::b2::nil)
| ?b1 = ?b2 -> ?g => let l := lterm_goal g in constr:(b1::b2::l)
end.
Ltac reify_goal l le lb:=
match le with
nil => idtac
| ?e::?le1 =>
match lb with
?b::?lb1 =>
let x := fresh "B" in
set (x:= b) at 1;
change x with (@interpret3 _ _ e l);
clear x;
reify_goal l le1 lb1
end
end.
Ltac get_lpol g :=
match g with
(interpret3 _ _ ?p _) = _ => constr:(p::nil)
| (interpret3 _ _ ?p _) = _ -> ?g =>
let l := get_lpol g in constr:(p::l)
end.
Ltac nsatz_domain_generic radicalmax info lparam lvar tacsimpl Rd :=
match goal with
|- ?g => let lb := lterm_goal g in
(*idtac "lb"; idtac lb;*)
match eval red in (li_reifyl (lb:=lb)) with
| (?fv, ?le) =>
let fv := match lvar with
(@nil _) => fv
| _ => lvar
end in
(* idtac "variables:";idtac fv;*)
let nparam := eval compute in (Z_of_nat (List.length lparam)) in
let fv := parametres_en_tete fv lparam in
(*idtac "variables:"; idtac fv;
idtac "nparam:"; idtac nparam;*)
match eval red in (li_reifyl (l:=fv) (lb:=lb)) with
| (?fv, ?le) =>
idtac "variables:";idtac fv;
reify_goal fv le lb;
match goal with
|- ?g =>
let lp := get_lpol g in
let lpol := eval compute in (List.rev lp) in
(*idtac "polynomes:"; idtac lpol;*)
tacsimpl; intros;
let SplitPolyList kont :=
match lpol with
| ?p2::?lp2 => kont p2 lp2
| _ => idtac "polynomial not in the ideal"
end in
tacsimpl;
SplitPolyList ltac:(fun p lp =>
set (p21:=p) ;
set (lp21:=lp);
(*idtac "lp:"; idtac lp; *)
nsatz_call radicalmax info nparam p lp ltac:(fun c r lq lci =>
set (q := PEmul c (PEpow p21 r));
let Hg := fresh "Hg" in
assert (Hg:check lp21 q (lci,lq) = true);
[ (vm_compute;reflexivity) || idtac "invalid nsatz certificate"
| let Hg2 := fresh "Hg" in
assert (Hg2: interpret3 _ _ q fv = ring0);
[ tacsimpl;
apply (@check_correct _ Rd fv lp21 q (lci,lq) Hg);
tacsimpl;
repeat (split;[assumption|idtac]); exact I
| simpl in Hg2; tacsimpl;
apply Rdomain_pow with (interpret3 _ _ c fv) (Nnat.nat_of_N r); tacsimpl;
[ apply domain_axiom_one_zero || idtac "could not prove discrimination result"
| exact Hg2]
]
]
)
)
end end end end .
Ltac nsatz_domainpv radicalmax info lparam lvar tacsimpl rd:=
nsatz_domain_begin tacsimpl;
nsatz_domain_generic radicalmax info lparam lvar tacsimpl rd.
Ltac nsatz_domain:=
intros;
match goal with
|- (@eq ?r _ _ ) =>
let a := constr:(@Ireify_zero _ _ (@nil r)) in
match a with
(@Ireify_zero _ ?rd _) =>
nsatz_domainpv 6%N 1%Z (@nil r) (@nil r) ltac:(simpl) rd
end
end.
(* Dans Z *)
Instance Zri : Ring Z := {
ring0 := 0%Z;
ring1 := 1%Z;
ring_plus := Zplus;
ring_mult := Zmult;
ring_sub := Zminus;
ring_opp := Zopp;
ring_ring := Zth}.
Lemma Zaxiom_one_zero: 1%Z <> 0%Z.
discriminate.
Qed.
Instance Zdi : Domain Z := {
domain_ring := Zri;
domain_axiom_product := Zmult_integral;
domain_axiom_one_zero := Zaxiom_one_zero}.
Ltac simplZ:=
simpl;
replace 0%Z with (@ring0 _ (@domain_ring _ Zdi));[idtac|reflexivity];
replace 1%Z with (@ring1 _ (@domain_ring _ Zdi));[idtac|reflexivity];
replace Zplus with (@ring_plus _ (@domain_ring _ Zdi));[idtac|reflexivity];
replace Zmult with (@ring_mult _ (@domain_ring _ Zdi));[idtac|reflexivity];
replace Zminus with (@ring_sub _ (@domain_ring _ Zdi));[idtac|reflexivity];
replace Zopp with (@ring_opp _ (@domain_ring _ Zdi));[idtac|reflexivity].
Ltac nsatz_domainZ:= nsatz_domainpv 6%N 1%Z (@nil Z) (@nil Z) ltac:simplZ Zdi.
(* Dans R *)
Require Import Reals.
Require Import RealField.
Instance Rri : Ring R := {
ring0 := 0%R;
ring1 := 1%R;
ring_plus := Rplus;
ring_mult := Rmult;
ring_sub := Rminus;
ring_opp := Ropp;
ring_ring := RTheory}.
Lemma Raxiom_one_zero: 1%R <> 0%R.
discrR.
Qed.
Instance Rdi : Domain R := {
domain_ring := Rri;
domain_axiom_product := Rmult_integral;
domain_axiom_one_zero := Raxiom_one_zero}.
Ltac simplR:=
simpl;
replace 0%R with (@ring0 _ (@domain_ring _ Rdi));[idtac|reflexivity];
replace 1%R with (@ring1 _ (@domain_ring _ Rdi));[idtac|reflexivity];
replace Rplus with (@ring_plus _ (@domain_ring _ Rdi));[idtac|reflexivity];
replace Rmult with (@ring_mult _ (@domain_ring _ Rdi));[idtac|reflexivity];
replace Rminus with (@ring_sub _ (@domain_ring _ Rdi));[idtac|reflexivity];
replace Ropp with (@ring_opp _ (@domain_ring _ Rdi));[idtac|reflexivity].
Ltac nsatz_domainR:= nsatz_domainpv 6%N 1%Z (@List.nil R) (@List.nil R) ltac:simplR Rdi.
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