type __ = Obj.t let __ = let rec f _ = Obj.repr f in Obj.repr f type bool = | True | False (** val negb : bool -> bool **) let negb = function | True -> False | False -> True type nat = | O | S of nat type 'a option = | Some of 'a | None type ('a, 'b) prod = | Pair of 'a * 'b type comparison = | Eq | Lt | Gt (** val compOpp : comparison -> comparison **) let compOpp = function | Eq -> Eq | Lt -> Gt | Gt -> Lt type sumbool = | Left | Right type 'a sumor = | Inleft of 'a | Inright type 'a list = | Nil | Cons of 'a * 'a list (** val app : 'a1 list -> 'a1 list -> 'a1 list **) let rec app l m = match l with | Nil -> m | Cons (a, l1) -> Cons (a, (app l1 m)) (** val nth : nat -> 'a1 list -> 'a1 -> 'a1 **) let rec nth n0 l default = match n0 with | O -> (match l with | Nil -> default | Cons (x, l') -> x) | S m -> (match l with | Nil -> default | Cons (x, t0) -> nth m t0 default) (** val map : ('a1 -> 'a2) -> 'a1 list -> 'a2 list **) let rec map f = function | Nil -> Nil | Cons (a, t0) -> Cons ((f a), (map f t0)) type positive = | XI of positive | XO of positive | XH (** val psucc : positive -> positive **) let rec psucc = function | XI p -> XO (psucc p) | XO p -> XI p | XH -> XO XH (** val pplus : positive -> positive -> positive **) let rec pplus x y = match x with | XI p -> (match y with | XI q0 -> XO (pplus_carry p q0) | XO q0 -> XI (pplus p q0) | XH -> XO (psucc p)) | XO p -> (match y with | XI q0 -> XI (pplus p q0) | XO q0 -> XO (pplus p q0) | XH -> XI p) | XH -> (match y with | XI q0 -> XO (psucc q0) | XO q0 -> XI q0 | XH -> XO XH) (** val pplus_carry : positive -> positive -> positive **) and pplus_carry x y = match x with | XI p -> (match y with | XI q0 -> XI (pplus_carry p q0) | XO q0 -> XO (pplus_carry p q0) | XH -> XI (psucc p)) | XO p -> (match y with | XI q0 -> XO (pplus_carry p q0) | XO q0 -> XI (pplus p q0) | XH -> XO (psucc p)) | XH -> (match y with | XI q0 -> XI (psucc q0) | XO q0 -> XO (psucc q0) | XH -> XI XH) (** val p_of_succ_nat : nat -> positive **) let rec p_of_succ_nat = function | O -> XH | S x -> psucc (p_of_succ_nat x) (** val pdouble_minus_one : positive -> positive **) let rec pdouble_minus_one = function | XI p -> XI (XO p) | XO p -> XI (pdouble_minus_one p) | XH -> XH type positive_mask = | IsNul | IsPos of positive | IsNeg (** val pdouble_plus_one_mask : positive_mask -> positive_mask **) let pdouble_plus_one_mask = function | IsNul -> IsPos XH | IsPos p -> IsPos (XI p) | IsNeg -> IsNeg (** val pdouble_mask : positive_mask -> positive_mask **) let pdouble_mask = function | IsNul -> IsNul | IsPos p -> IsPos (XO p) | IsNeg -> IsNeg (** val pdouble_minus_two : positive -> positive_mask **) let pdouble_minus_two = function | XI p -> IsPos (XO (XO p)) | XO p -> IsPos (XO (pdouble_minus_one p)) | XH -> IsNul (** val pminus_mask : positive -> positive -> positive_mask **) let rec pminus_mask x y = match x with | XI p -> (match y with | XI q0 -> pdouble_mask (pminus_mask p q0) | XO q0 -> pdouble_plus_one_mask (pminus_mask p q0) | XH -> IsPos (XO p)) | XO p -> (match y with | XI q0 -> pdouble_plus_one_mask (pminus_mask_carry p q0) | XO q0 -> pdouble_mask (pminus_mask p q0) | XH -> IsPos (pdouble_minus_one p)) | XH -> (match y with | XH -> IsNul | _ -> IsNeg) (** val pminus_mask_carry : positive -> positive -> positive_mask **) and pminus_mask_carry x y = match x with | XI p -> (match y with | XI q0 -> pdouble_plus_one_mask (pminus_mask_carry p q0) | XO q0 -> pdouble_mask (pminus_mask p q0) | XH -> IsPos (pdouble_minus_one p)) | XO p -> (match y with | XI q0 -> pdouble_mask (pminus_mask_carry p q0) | XO q0 -> pdouble_plus_one_mask (pminus_mask_carry p q0) | XH -> pdouble_minus_two p) | XH -> IsNeg (** val pminus : positive -> positive -> positive **) let pminus x y = match pminus_mask x y with | IsPos z0 -> z0 | _ -> XH (** val pmult : positive -> positive -> positive **) let rec pmult x y = match x with | XI p -> pplus y (XO (pmult p y)) | XO p -> XO (pmult p y) | XH -> y (** val pcompare : positive -> positive -> comparison -> comparison **) let rec pcompare x y r = match x with | XI p -> (match y with | XI q0 -> pcompare p q0 r | XO q0 -> pcompare p q0 Gt | XH -> Gt) | XO p -> (match y with | XI q0 -> pcompare p q0 Lt | XO q0 -> pcompare p q0 r | XH -> Gt) | XH -> (match y with | XH -> r | _ -> Lt) type n = | N0 | Npos of positive type z = | Z0 | Zpos of positive | Zneg of positive (** val zdouble_plus_one : z -> z **) let zdouble_plus_one = function | Z0 -> Zpos XH | Zpos p -> Zpos (XI p) | Zneg p -> Zneg (pdouble_minus_one p) (** val zdouble_minus_one : z -> z **) let zdouble_minus_one = function | Z0 -> Zneg XH | Zpos p -> Zpos (pdouble_minus_one p) | Zneg p -> Zneg (XI p) (** val zdouble : z -> z **) let zdouble = function | Z0 -> Z0 | Zpos p -> Zpos (XO p) | Zneg p -> Zneg (XO p) (** val zPminus : positive -> positive -> z **) let rec zPminus x y = match x with | XI p -> (match y with | XI q0 -> zdouble (zPminus p q0) | XO q0 -> zdouble_plus_one (zPminus p q0) | XH -> Zpos (XO p)) | XO p -> (match y with | XI q0 -> zdouble_minus_one (zPminus p q0) | XO q0 -> zdouble (zPminus p q0) | XH -> Zpos (pdouble_minus_one p)) | XH -> (match y with | XI q0 -> Zneg (XO q0) | XO q0 -> Zneg (pdouble_minus_one q0) | XH -> Z0) (** val zplus : z -> z -> z **) let zplus x y = match x with | Z0 -> y | Zpos x' -> (match y with | Z0 -> Zpos x' | Zpos y' -> Zpos (pplus x' y') | Zneg y' -> (match pcompare x' y' Eq with | Eq -> Z0 | Lt -> Zneg (pminus y' x') | Gt -> Zpos (pminus x' y'))) | Zneg x' -> (match y with | Z0 -> Zneg x' | Zpos y' -> (match pcompare x' y' Eq with | Eq -> Z0 | Lt -> Zpos (pminus y' x') | Gt -> Zneg (pminus x' y')) | Zneg y' -> Zneg (pplus x' y')) (** val zopp : z -> z **) let zopp = function | Z0 -> Z0 | Zpos x0 -> Zneg x0 | Zneg x0 -> Zpos x0 (** val zminus : z -> z -> z **) let zminus m n0 = zplus m (zopp n0) (** val zmult : z -> z -> z **) let zmult x y = match x with | Z0 -> Z0 | Zpos x' -> (match y with | Z0 -> Z0 | Zpos y' -> Zpos (pmult x' y') | Zneg y' -> Zneg (pmult x' y')) | Zneg x' -> (match y with | Z0 -> Z0 | Zpos y' -> Zneg (pmult x' y') | Zneg y' -> Zpos (pmult x' y')) (** val zcompare : z -> z -> comparison **) let zcompare x y = match x with | Z0 -> (match y with | Z0 -> Eq | Zpos y' -> Lt | Zneg y' -> Gt) | Zpos x' -> (match y with | Zpos y' -> pcompare x' y' Eq | _ -> Gt) | Zneg x' -> (match y with | Zneg y' -> compOpp (pcompare x' y' Eq) | _ -> Lt) (** val dcompare_inf : comparison -> sumbool sumor **) let dcompare_inf = function | Eq -> Inleft Left | Lt -> Inleft Right | Gt -> Inright (** val zcompare_rec : z -> z -> (__ -> 'a1) -> (__ -> 'a1) -> (__ -> 'a1) -> 'a1 **) let zcompare_rec x y h1 h2 h3 = match dcompare_inf (zcompare x y) with | Inleft x0 -> (match x0 with | Left -> h1 __ | Right -> h2 __) | Inright -> h3 __ (** val z_gt_dec : z -> z -> sumbool **) let z_gt_dec x y = zcompare_rec x y (fun _ -> Right) (fun _ -> Right) (fun _ -> Left) (** val zle_bool : z -> z -> bool **) let zle_bool x y = match zcompare x y with | Gt -> False | _ -> True (** val zge_bool : z -> z -> bool **) let zge_bool x y = match zcompare x y with | Lt -> False | _ -> True (** val zgt_bool : z -> z -> bool **) let zgt_bool x y = match zcompare x y with | Gt -> True | _ -> False (** val zeq_bool : z -> z -> bool **) let zeq_bool x y = match zcompare x y with | Eq -> True | _ -> False (** val n_of_nat : nat -> n **) let n_of_nat = function | O -> N0 | S n' -> Npos (p_of_succ_nat n') (** val zdiv_eucl_POS : positive -> z -> (z, z) prod **) let rec zdiv_eucl_POS a b = match a with | XI a' -> let Pair (q0, r) = zdiv_eucl_POS a' b in let r' = zplus (zmult (Zpos (XO XH)) r) (Zpos XH) in (match zgt_bool b r' with | True -> Pair ((zmult (Zpos (XO XH)) q0), r') | False -> Pair ((zplus (zmult (Zpos (XO XH)) q0) (Zpos XH)), (zminus r' b))) | XO a' -> let Pair (q0, r) = zdiv_eucl_POS a' b in let r' = zmult (Zpos (XO XH)) r in (match zgt_bool b r' with | True -> Pair ((zmult (Zpos (XO XH)) q0), r') | False -> Pair ((zplus (zmult (Zpos (XO XH)) q0) (Zpos XH)), (zminus r' b))) | XH -> (match zge_bool b (Zpos (XO XH)) with | True -> Pair (Z0, (Zpos XH)) | False -> Pair ((Zpos XH), Z0)) (** val zdiv_eucl : z -> z -> (z, z) prod **) let zdiv_eucl a b = match a with | Z0 -> Pair (Z0, Z0) | Zpos a' -> (match b with | Z0 -> Pair (Z0, Z0) | Zpos p -> zdiv_eucl_POS a' b | Zneg b' -> let Pair (q0, r) = zdiv_eucl_POS a' (Zpos b') in (match r with | Z0 -> Pair ((zopp q0), Z0) | _ -> Pair ((zopp (zplus q0 (Zpos XH))), (zplus b r)))) | Zneg a' -> (match b with | Z0 -> Pair (Z0, Z0) | Zpos p -> let Pair (q0, r) = zdiv_eucl_POS a' b in (match r with | Z0 -> Pair ((zopp q0), Z0) | _ -> Pair ((zopp (zplus q0 (Zpos XH))), (zminus b r))) | Zneg b' -> let Pair (q0, r) = zdiv_eucl_POS a' (Zpos b') in Pair (q0, (zopp r))) type 'c pol = | Pc of 'c | Pinj of positive * 'c pol | PX of 'c pol * positive * 'c pol (** val p0 : 'a1 -> 'a1 pol **) let p0 cO = Pc cO (** val p1 : 'a1 -> 'a1 pol **) let p1 cI = Pc cI (** val peq : ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 pol -> bool **) let rec peq ceqb p p' = match p with | Pc c -> (match p' with | Pc c' -> ceqb c c' | _ -> False) | Pinj (j, q0) -> (match p' with | Pinj (j', q') -> (match pcompare j j' Eq with | Eq -> peq ceqb q0 q' | _ -> False) | _ -> False) | PX (p2, i, q0) -> (match p' with | PX (p'0, i', q') -> (match pcompare i i' Eq with | Eq -> (match peq ceqb p2 p'0 with | True -> peq ceqb q0 q' | False -> False) | _ -> False) | _ -> False) (** val mkPinj_pred : positive -> 'a1 pol -> 'a1 pol **) let mkPinj_pred j p = match j with | XI j0 -> Pinj ((XO j0), p) | XO j0 -> Pinj ((pdouble_minus_one j0), p) | XH -> p (** val mkPX : 'a1 -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let mkPX cO ceqb p i q0 = match p with | Pc c -> (match ceqb c cO with | True -> (match q0 with | Pc c0 -> q0 | Pinj (j', q1) -> Pinj ((pplus XH j'), q1) | PX (p2, p3, p4) -> Pinj (XH, q0)) | False -> PX (p, i, q0)) | Pinj (p2, p3) -> PX (p, i, q0) | PX (p', i', q') -> (match peq ceqb q' (p0 cO) with | True -> PX (p', (pplus i' i), q0) | False -> PX (p, i, q0)) (** val mkXi : 'a1 -> 'a1 -> positive -> 'a1 pol **) let mkXi cO cI i = PX ((p1 cI), i, (p0 cO)) (** val mkX : 'a1 -> 'a1 -> 'a1 pol **) let mkX cO cI = mkXi cO cI XH (** val popp : ('a1 -> 'a1) -> 'a1 pol -> 'a1 pol **) let rec popp copp = function | Pc c -> Pc (copp c) | Pinj (j, q0) -> Pinj (j, (popp copp q0)) | PX (p2, i, q0) -> PX ((popp copp p2), i, (popp copp q0)) (** val paddC : ('a1 -> 'a1 -> 'a1) -> 'a1 pol -> 'a1 -> 'a1 pol **) let rec paddC cadd p c = match p with | Pc c1 -> Pc (cadd c1 c) | Pinj (j, q0) -> Pinj (j, (paddC cadd q0 c)) | PX (p2, i, q0) -> PX (p2, i, (paddC cadd q0 c)) (** val psubC : ('a1 -> 'a1 -> 'a1) -> 'a1 pol -> 'a1 -> 'a1 pol **) let rec psubC csub p c = match p with | Pc c1 -> Pc (csub c1 c) | Pinj (j, q0) -> Pinj (j, (psubC csub q0 c)) | PX (p2, i, q0) -> PX (p2, i, (psubC csub q0 c)) (** val paddI : ('a1 -> 'a1 -> 'a1) -> ('a1 pol -> 'a1 pol -> 'a1 pol) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let rec paddI cadd pop q0 j = function | Pc c -> let p2 = paddC cadd q0 c in (match p2 with | Pc c0 -> p2 | Pinj (j', q1) -> Pinj ((pplus j j'), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Pinj (j', q') -> (match zPminus j' j with | Z0 -> let p2 = pop q' q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zpos k -> let p2 = pop (Pinj (k, q')) q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zneg k -> let p2 = paddI cadd pop q0 k q' in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j' j'0), q1) | PX (p3, p4, p5) -> Pinj (j', p2))) | PX (p2, i, q') -> (match j with | XI j0 -> PX (p2, i, (paddI cadd pop q0 (XO j0) q')) | XO j0 -> PX (p2, i, (paddI cadd pop q0 (pdouble_minus_one j0) q')) | XH -> PX (p2, i, (pop q' q0))) (** val psubI : ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 pol -> 'a1 pol -> 'a1 pol) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let rec psubI cadd copp pop q0 j = function | Pc c -> let p2 = paddC cadd (popp copp q0) c in (match p2 with | Pc c0 -> p2 | Pinj (j', q1) -> Pinj ((pplus j j'), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Pinj (j', q') -> (match zPminus j' j with | Z0 -> let p2 = pop q' q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zpos k -> let p2 = pop (Pinj (k, q')) q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zneg k -> let p2 = psubI cadd copp pop q0 k q' in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j' j'0), q1) | PX (p3, p4, p5) -> Pinj (j', p2))) | PX (p2, i, q') -> (match j with | XI j0 -> PX (p2, i, (psubI cadd copp pop q0 (XO j0) q')) | XO j0 -> PX (p2, i, (psubI cadd copp pop q0 (pdouble_minus_one j0) q')) | XH -> PX (p2, i, (pop q' q0))) (** val paddX : 'a1 -> ('a1 -> 'a1 -> bool) -> ('a1 pol -> 'a1 pol -> 'a1 pol) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let rec paddX cO ceqb pop p' i' p = match p with | Pc c -> PX (p', i', p) | Pinj (j, q') -> (match j with | XI j0 -> PX (p', i', (Pinj ((XO j0), q'))) | XO j0 -> PX (p', i', (Pinj ((pdouble_minus_one j0), q'))) | XH -> PX (p', i', q')) | PX (p2, i, q') -> (match zPminus i i' with | Z0 -> mkPX cO ceqb (pop p2 p') i q' | Zpos k -> mkPX cO ceqb (pop (PX (p2, k, (p0 cO))) p') i' q' | Zneg k -> mkPX cO ceqb (paddX cO ceqb pop p' k p2) i q') (** val psubX : 'a1 -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 pol -> 'a1 pol -> 'a1 pol) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let rec psubX cO copp ceqb pop p' i' p = match p with | Pc c -> PX ((popp copp p'), i', p) | Pinj (j, q') -> (match j with | XI j0 -> PX ((popp copp p'), i', (Pinj ((XO j0), q'))) | XO j0 -> PX ((popp copp p'), i', (Pinj ( (pdouble_minus_one j0), q'))) | XH -> PX ((popp copp p'), i', q')) | PX (p2, i, q') -> (match zPminus i i' with | Z0 -> mkPX cO ceqb (pop p2 p') i q' | Zpos k -> mkPX cO ceqb (pop (PX (p2, k, (p0 cO))) p') i' q' | Zneg k -> mkPX cO ceqb (psubX cO copp ceqb pop p' k p2) i q') (** val padd : 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 pol -> 'a1 pol **) let rec padd cO cadd ceqb p = function | Pc c' -> paddC cadd p c' | Pinj (j', q') -> paddI cadd (fun x x0 -> padd cO cadd ceqb x x0) q' j' p | PX (p'0, i', q') -> (match p with | Pc c -> PX (p'0, i', (paddC cadd q' c)) | Pinj (j, q0) -> (match j with | XI j0 -> PX (p'0, i', (padd cO cadd ceqb (Pinj ((XO j0), q0)) q')) | XO j0 -> PX (p'0, i', (padd cO cadd ceqb (Pinj ((pdouble_minus_one j0), q0)) q')) | XH -> PX (p'0, i', (padd cO cadd ceqb q0 q'))) | PX (p2, i, q0) -> (match zPminus i i' with | Z0 -> mkPX cO ceqb (padd cO cadd ceqb p2 p'0) i (padd cO cadd ceqb q0 q') | Zpos k -> mkPX cO ceqb (padd cO cadd ceqb (PX (p2, k, (p0 cO))) p'0) i' (padd cO cadd ceqb q0 q') | Zneg k -> mkPX cO ceqb (paddX cO ceqb (fun x x0 -> padd cO cadd ceqb x x0) p'0 k p2) i (padd cO cadd ceqb q0 q'))) (** val psub : 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 pol -> 'a1 pol **) let rec psub cO cadd csub copp ceqb p = function | Pc c' -> psubC csub p c' | Pinj (j', q') -> psubI cadd copp (fun x x0 -> psub cO cadd csub copp ceqb x x0) q' j' p | PX (p'0, i', q') -> (match p with | Pc c -> PX ((popp copp p'0), i', (paddC cadd (popp copp q') c)) | Pinj (j, q0) -> (match j with | XI j0 -> PX ((popp copp p'0), i', (psub cO cadd csub copp ceqb (Pinj ((XO j0), q0)) q')) | XO j0 -> PX ((popp copp p'0), i', (psub cO cadd csub copp ceqb (Pinj ((pdouble_minus_one j0), q0)) q')) | XH -> PX ((popp copp p'0), i', (psub cO cadd csub copp ceqb q0 q'))) | PX (p2, i, q0) -> (match zPminus i i' with | Z0 -> mkPX cO ceqb (psub cO cadd csub copp ceqb p2 p'0) i (psub cO cadd csub copp ceqb q0 q') | Zpos k -> mkPX cO ceqb (psub cO cadd csub copp ceqb (PX (p2, k, (p0 cO))) p'0) i' (psub cO cadd csub copp ceqb q0 q') | Zneg k -> mkPX cO ceqb (psubX cO copp ceqb (fun x x0 -> psub cO cadd csub copp ceqb x x0) p'0 k p2) i (psub cO cadd csub copp ceqb q0 q'))) (** val pmulC_aux : 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 -> 'a1 pol **) let rec pmulC_aux cO cmul ceqb p c = match p with | Pc c' -> Pc (cmul c' c) | Pinj (j, q0) -> let p2 = pmulC_aux cO cmul ceqb q0 c in (match p2 with | Pc c0 -> p2 | Pinj (j', q1) -> Pinj ((pplus j j'), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | PX (p2, i, q0) -> mkPX cO ceqb (pmulC_aux cO cmul ceqb p2 c) i (pmulC_aux cO cmul ceqb q0 c) (** val pmulC : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 -> 'a1 pol **) let pmulC cO cI cmul ceqb p c = match ceqb c cO with | True -> p0 cO | False -> (match ceqb c cI with | True -> p | False -> pmulC_aux cO cmul ceqb p c) (** val pmulI : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 pol -> 'a1 pol -> 'a1 pol) -> 'a1 pol -> positive -> 'a1 pol -> 'a1 pol **) let rec pmulI cO cI cmul ceqb pmul0 q0 j = function | Pc c -> let p2 = pmulC cO cI cmul ceqb q0 c in (match p2 with | Pc c0 -> p2 | Pinj (j', q1) -> Pinj ((pplus j j'), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Pinj (j', q') -> (match zPminus j' j with | Z0 -> let p2 = pmul0 q' q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zpos k -> let p2 = pmul0 (Pinj (k, q')) q0 in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j j'0), q1) | PX (p3, p4, p5) -> Pinj (j, p2)) | Zneg k -> let p2 = pmulI cO cI cmul ceqb pmul0 q0 k q' in (match p2 with | Pc c -> p2 | Pinj (j'0, q1) -> Pinj ((pplus j' j'0), q1) | PX (p3, p4, p5) -> Pinj (j', p2))) | PX (p', i', q') -> (match j with | XI j' -> mkPX cO ceqb (pmulI cO cI cmul ceqb pmul0 q0 j p') i' (pmulI cO cI cmul ceqb pmul0 q0 (XO j') q') | XO j' -> mkPX cO ceqb (pmulI cO cI cmul ceqb pmul0 q0 j p') i' (pmulI cO cI cmul ceqb pmul0 q0 (pdouble_minus_one j') q') | XH -> mkPX cO ceqb (pmulI cO cI cmul ceqb pmul0 q0 XH p') i' (pmul0 q' q0)) (** val pmul : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pol -> 'a1 pol -> 'a1 pol **) let rec pmul cO cI cadd cmul ceqb p p'' = match p'' with | Pc c -> pmulC cO cI cmul ceqb p c | Pinj (j', q') -> pmulI cO cI cmul ceqb (fun x x0 -> pmul cO cI cadd cmul ceqb x x0) q' j' p | PX (p', i', q') -> (match p with | Pc c -> pmulC cO cI cmul ceqb p'' c | Pinj (j, q0) -> mkPX cO ceqb (pmul cO cI cadd cmul ceqb p p') i' (match j with | XI j0 -> pmul cO cI cadd cmul ceqb (Pinj ((XO j0), q0)) q' | XO j0 -> pmul cO cI cadd cmul ceqb (Pinj ((pdouble_minus_one j0), q0)) q' | XH -> pmul cO cI cadd cmul ceqb q0 q') | PX (p2, i, q0) -> padd cO cadd ceqb (mkPX cO ceqb (padd cO cadd ceqb (mkPX cO ceqb (pmul cO cI cadd cmul ceqb p2 p') i (p0 cO)) (pmul cO cI cadd cmul ceqb (match q0 with | Pc c -> q0 | Pinj (j', q1) -> Pinj ((pplus XH j'), q1) | PX (p3, p4, p5) -> Pinj (XH, q0)) p')) i' (p0 cO)) (mkPX cO ceqb (pmulI cO cI cmul ceqb (fun x x0 -> pmul cO cI cadd cmul ceqb x x0) q' XH p2) i (pmul cO cI cadd cmul ceqb q0 q'))) type 'c pExpr = | PEc of 'c | PEX of positive | PEadd of 'c pExpr * 'c pExpr | PEsub of 'c pExpr * 'c pExpr | PEmul of 'c pExpr * 'c pExpr | PEopp of 'c pExpr | PEpow of 'c pExpr * n (** val mk_X : 'a1 -> 'a1 -> positive -> 'a1 pol **) let mk_X cO cI j = mkPinj_pred j (mkX cO cI) (** val ppow_pos : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 pol -> 'a1 pol) -> 'a1 pol -> 'a1 pol -> positive -> 'a1 pol **) let rec ppow_pos cO cI cadd cmul ceqb subst_l res p = function | XI p3 -> subst_l (pmul cO cI cadd cmul ceqb (ppow_pos cO cI cadd cmul ceqb subst_l (ppow_pos cO cI cadd cmul ceqb subst_l res p p3) p p3) p) | XO p3 -> ppow_pos cO cI cadd cmul ceqb subst_l (ppow_pos cO cI cadd cmul ceqb subst_l res p p3) p p3 | XH -> subst_l (pmul cO cI cadd cmul ceqb res p) (** val ppow_N : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 pol -> 'a1 pol) -> 'a1 pol -> n -> 'a1 pol **) let ppow_N cO cI cadd cmul ceqb subst_l p = function | N0 -> p1 cI | Npos p2 -> ppow_pos cO cI cadd cmul ceqb subst_l (p1 cI) p p2 (** val norm_aux : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pExpr -> 'a1 pol **) let rec norm_aux cO cI cadd cmul csub copp ceqb = function | PEc c -> Pc c | PEX j -> mk_X cO cI j | PEadd (pe1, pe2) -> (match pe1 with | PEopp pe3 -> psub cO cadd csub copp ceqb (norm_aux cO cI cadd cmul csub copp ceqb pe2) (norm_aux cO cI cadd cmul csub copp ceqb pe3) | _ -> (match pe2 with | PEopp pe3 -> psub cO cadd csub copp ceqb (norm_aux cO cI cadd cmul csub copp ceqb pe1) (norm_aux cO cI cadd cmul csub copp ceqb pe3) | _ -> padd cO cadd ceqb (norm_aux cO cI cadd cmul csub copp ceqb pe1) (norm_aux cO cI cadd cmul csub copp ceqb pe2))) | PEsub (pe1, pe2) -> psub cO cadd csub copp ceqb (norm_aux cO cI cadd cmul csub copp ceqb pe1) (norm_aux cO cI cadd cmul csub copp ceqb pe2) | PEmul (pe1, pe2) -> pmul cO cI cadd cmul ceqb (norm_aux cO cI cadd cmul csub copp ceqb pe1) (norm_aux cO cI cadd cmul csub copp ceqb pe2) | PEopp pe1 -> popp copp (norm_aux cO cI cadd cmul csub copp ceqb pe1) | PEpow (pe1, n0) -> ppow_N cO cI cadd cmul ceqb (fun p -> p) (norm_aux cO cI cadd cmul csub copp ceqb pe1) n0 type 'a bFormula = | TT | FF | X | A of 'a | Cj of 'a bFormula * 'a bFormula | D of 'a bFormula * 'a bFormula | N of 'a bFormula | I of 'a bFormula * 'a bFormula type 'term' clause = 'term' list type 'term' cnf = 'term' clause list (** val tt : 'a1 cnf **) let tt = Nil (** val ff : 'a1 cnf **) let ff = Cons (Nil, Nil) (** val or_clause_cnf : 'a1 clause -> 'a1 cnf -> 'a1 cnf **) let or_clause_cnf t0 f = map (fun x -> app t0 x) f (** val or_cnf : 'a1 cnf -> 'a1 cnf -> 'a1 cnf **) let rec or_cnf f f' = match f with | Nil -> tt | Cons (e, rst) -> app (or_cnf rst f') (or_clause_cnf e f') (** val and_cnf : 'a1 cnf -> 'a1 cnf -> 'a1 cnf **) let and_cnf f1 f2 = app f1 f2 (** val xcnf : ('a1 -> 'a2 cnf) -> ('a1 -> 'a2 cnf) -> bool -> 'a1 bFormula -> 'a2 cnf **) let rec xcnf normalise0 negate0 pol0 = function | TT -> (match pol0 with | True -> tt | False -> ff) | FF -> (match pol0 with | True -> ff | False -> tt) | X -> ff | A x -> (match pol0 with | True -> normalise0 x | False -> negate0 x) | Cj (e1, e2) -> (match pol0 with | True -> and_cnf (xcnf normalise0 negate0 pol0 e1) (xcnf normalise0 negate0 pol0 e2) | False -> or_cnf (xcnf normalise0 negate0 pol0 e1) (xcnf normalise0 negate0 pol0 e2)) | D (e1, e2) -> (match pol0 with | True -> or_cnf (xcnf normalise0 negate0 pol0 e1) (xcnf normalise0 negate0 pol0 e2) | False -> and_cnf (xcnf normalise0 negate0 pol0 e1) (xcnf normalise0 negate0 pol0 e2)) | N e -> xcnf normalise0 negate0 (negb pol0) e | I (e1, e2) -> (match pol0 with | True -> or_cnf (xcnf normalise0 negate0 (negb pol0) e1) (xcnf normalise0 negate0 pol0 e2) | False -> and_cnf (xcnf normalise0 negate0 (negb pol0) e1) (xcnf normalise0 negate0 pol0 e2)) (** val cnf_checker : ('a1 list -> 'a2 -> bool) -> 'a1 cnf -> 'a2 list -> bool **) let rec cnf_checker checker f l = match f with | Nil -> True | Cons (e, f0) -> (match l with | Nil -> False | Cons (c, l0) -> (match checker e c with | True -> cnf_checker checker f0 l0 | False -> False)) (** val tauto_checker : ('a1 -> 'a2 cnf) -> ('a1 -> 'a2 cnf) -> ('a2 list -> 'a3 -> bool) -> 'a1 bFormula -> 'a3 list -> bool **) let tauto_checker normalise0 negate0 checker f w = cnf_checker checker (xcnf normalise0 negate0 True f) w type 'c pExprC = 'c pExpr type 'c polC = 'c pol type op1 = | Equal | NonEqual | Strict | NonStrict type 'c nFormula = ('c pExprC, op1) prod type monoidMember = nat list type 'c coneMember = | S_In of nat | S_Ideal of 'c pExprC * 'c coneMember | S_Square of 'c pExprC | S_Monoid of monoidMember | S_Mult of 'c coneMember * 'c coneMember | S_Add of 'c coneMember * 'c coneMember | S_Pos of 'c | S_Z (** val nformula_times : 'a1 nFormula -> 'a1 nFormula -> 'a1 nFormula **) let nformula_times f f' = let Pair (p, op) = f in let Pair (p', op') = f' in Pair ((PEmul (p, p')), (match op with | Equal -> Equal | NonEqual -> NonEqual | Strict -> op' | NonStrict -> NonStrict)) (** val nformula_plus : 'a1 nFormula -> 'a1 nFormula -> 'a1 nFormula **) let nformula_plus f f' = let Pair (p, op) = f in let Pair (p', op') = f' in Pair ((PEadd (p, p')), (match op with | Equal -> op' | NonEqual -> NonEqual | Strict -> Strict | NonStrict -> (match op' with | Strict -> Strict | _ -> NonStrict))) (** val eval_monoid : 'a1 -> 'a1 nFormula list -> monoidMember -> 'a1 pExprC **) let rec eval_monoid cI l = function | Nil -> PEc cI | Cons (n0, ns0) -> PEmul ((let Pair (q0, o) = nth n0 l (Pair ((PEc cI), NonEqual)) in (match o with | NonEqual -> q0 | _ -> PEc cI)), (eval_monoid cI l ns0)) (** val eval_cone : 'a1 -> 'a1 -> ('a1 -> 'a1 -> bool) -> ('a1 -> 'a1 -> bool) -> 'a1 nFormula list -> 'a1 coneMember -> 'a1 nFormula **) let rec eval_cone cO cI ceqb cleb l = function | S_In n0 -> let Pair (p, o) = nth n0 l (Pair ((PEc cO), Equal)) in (match o with | NonEqual -> Pair ((PEc cO), Equal) | _ -> nth n0 l (Pair ((PEc cO), Equal))) | S_Ideal (p, cm') -> let f = eval_cone cO cI ceqb cleb l cm' in let Pair (q0, op) = f in (match op with | Equal -> Pair ((PEmul (q0, p)), Equal) | _ -> f) | S_Square p -> Pair ((PEmul (p, p)), NonStrict) | S_Monoid m -> let p = eval_monoid cI l m in Pair ((PEmul (p, p)), Strict) | S_Mult (p, q0) -> nformula_times (eval_cone cO cI ceqb cleb l p) (eval_cone cO cI ceqb cleb l q0) | S_Add (p, q0) -> nformula_plus (eval_cone cO cI ceqb cleb l p) (eval_cone cO cI ceqb cleb l q0) | S_Pos c -> (match match cleb cO c with | True -> negb (ceqb cO c) | False -> False with | True -> Pair ((PEc c), Strict) | False -> Pair ((PEc cO), Equal)) | S_Z -> Pair ((PEc cO), Equal) (** val normalise_pexpr : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 pExprC -> 'a1 polC **) let normalise_pexpr cO cI cplus ctimes cminus copp ceqb x = norm_aux cO cI cplus ctimes cminus copp ceqb x (** val check_inconsistent : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 -> 'a1 -> bool) -> 'a1 nFormula -> bool **) let check_inconsistent cO cI cplus ctimes cminus copp ceqb cleb = function | Pair (e, op) -> (match normalise_pexpr cO cI cplus ctimes cminus copp ceqb e with | Pc c -> (match op with | Equal -> negb (ceqb c cO) | NonEqual -> False | Strict -> cleb c cO | NonStrict -> (match cleb c cO with | True -> negb (ceqb c cO) | False -> False)) | _ -> False) (** val check_normalised_formulas : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> ('a1 -> 'a1 -> bool) -> 'a1 nFormula list -> 'a1 coneMember -> bool **) let check_normalised_formulas cO cI cplus ctimes cminus copp ceqb cleb l cm = check_inconsistent cO cI cplus ctimes cminus copp ceqb cleb (eval_cone cO cI ceqb cleb l cm) type op2 = | OpEq | OpNEq | OpLe | OpGe | OpLt | OpGt type 'c formula = { flhs : 'c pExprC; fop : op2; frhs : 'c pExprC } (** val flhs : 'a1 formula -> 'a1 pExprC **) let flhs x = x.flhs (** val fop : 'a1 formula -> op2 **) let fop x = x.fop (** val frhs : 'a1 formula -> 'a1 pExprC **) let frhs x = x.frhs (** val xnormalise : 'a1 formula -> 'a1 nFormula list **) let xnormalise t0 = let { flhs = lhs; fop = o; frhs = rhs } = t0 in (match o with | OpEq -> Cons ((Pair ((PEsub (lhs, rhs)), Strict)), (Cons ((Pair ((PEsub (rhs, lhs)), Strict)), Nil))) | OpNEq -> Cons ((Pair ((PEsub (lhs, rhs)), Equal)), Nil) | OpLe -> Cons ((Pair ((PEsub (lhs, rhs)), Strict)), Nil) | OpGe -> Cons ((Pair ((PEsub (rhs, lhs)), Strict)), Nil) | OpLt -> Cons ((Pair ((PEsub (lhs, rhs)), NonStrict)), Nil) | OpGt -> Cons ((Pair ((PEsub (rhs, lhs)), NonStrict)), Nil)) (** val cnf_normalise : 'a1 formula -> 'a1 nFormula cnf **) let cnf_normalise t0 = map (fun x -> Cons (x, Nil)) (xnormalise t0) (** val xnegate : 'a1 formula -> 'a1 nFormula list **) let xnegate t0 = let { flhs = lhs; fop = o; frhs = rhs } = t0 in (match o with | OpEq -> Cons ((Pair ((PEsub (lhs, rhs)), Equal)), Nil) | OpNEq -> Cons ((Pair ((PEsub (lhs, rhs)), Strict)), (Cons ((Pair ((PEsub (rhs, lhs)), Strict)), Nil))) | OpLe -> Cons ((Pair ((PEsub (rhs, lhs)), NonStrict)), Nil) | OpGe -> Cons ((Pair ((PEsub (lhs, rhs)), NonStrict)), Nil) | OpLt -> Cons ((Pair ((PEsub (rhs, lhs)), Strict)), Nil) | OpGt -> Cons ((Pair ((PEsub (lhs, rhs)), Strict)), Nil)) (** val cnf_negate : 'a1 formula -> 'a1 nFormula cnf **) let cnf_negate t0 = map (fun x -> Cons (x, Nil)) (xnegate t0) (** val simpl_expr : 'a1 -> ('a1 -> 'a1 -> bool) -> 'a1 pExprC -> 'a1 pExprC **) let rec simpl_expr cI ceqb e = match e with | PEadd (x, y) -> PEadd ((simpl_expr cI ceqb x), (simpl_expr cI ceqb y)) | PEmul (y, z0) -> let y' = simpl_expr cI ceqb y in (match y' with | PEc c -> (match ceqb c cI with | True -> simpl_expr cI ceqb z0 | False -> PEmul (y', (simpl_expr cI ceqb z0))) | _ -> PEmul (y', (simpl_expr cI ceqb z0))) | _ -> e (** val simpl_cone : 'a1 -> 'a1 -> ('a1 -> 'a1 -> 'a1) -> ('a1 -> 'a1 -> bool) -> 'a1 coneMember -> 'a1 coneMember **) let simpl_cone cO cI ctimes ceqb e = match e with | S_Square t0 -> (match simpl_expr cI ceqb t0 with | PEc c -> (match ceqb cO c with | True -> S_Z | False -> S_Pos (ctimes c c)) | _ -> S_Square (simpl_expr cI ceqb t0)) | S_Mult (t1, t2) -> (match t1 with | S_Mult (x, x0) -> (match x with | S_Pos p2 -> (match t2 with | S_Pos c -> S_Mult ((S_Pos (ctimes c p2)), x0) | S_Z -> S_Z | _ -> e) | _ -> (match x0 with | S_Pos p2 -> (match t2 with | S_Pos c -> S_Mult ((S_Pos (ctimes c p2)), x) | S_Z -> S_Z | _ -> e) | _ -> (match t2 with | S_Pos c -> (match ceqb cI c with | True -> t1 | False -> S_Mult (t1, t2)) | S_Z -> S_Z | _ -> e))) | S_Pos c -> (match t2 with | S_Mult (x, x0) -> (match x with | S_Pos p2 -> S_Mult ((S_Pos (ctimes c p2)), x0) | _ -> (match x0 with | S_Pos p2 -> S_Mult ((S_Pos (ctimes c p2)), x) | _ -> (match ceqb cI c with | True -> t2 | False -> S_Mult (t1, t2)))) | S_Add (y, z0) -> S_Add ((S_Mult ((S_Pos c), y)), (S_Mult ((S_Pos c), z0))) | S_Pos c0 -> S_Pos (ctimes c c0) | S_Z -> S_Z | _ -> (match ceqb cI c with | True -> t2 | False -> S_Mult (t1, t2))) | S_Z -> S_Z | _ -> (match t2 with | S_Pos c -> (match ceqb cI c with | True -> t1 | False -> S_Mult (t1, t2)) | S_Z -> S_Z | _ -> e)) | S_Add (t1, t2) -> (match t1 with | S_Z -> t2 | _ -> (match t2 with | S_Z -> t1 | _ -> S_Add (t1, t2))) | _ -> e type q = { qnum : z; qden : positive } (** val qnum : q -> z **) let qnum x = x.qnum (** val qden : q -> positive **) let qden x = x.qden (** val qplus : q -> q -> q **) let qplus x y = { qnum = (zplus (zmult x.qnum (Zpos y.qden)) (zmult y.qnum (Zpos x.qden))); qden = (pmult x.qden y.qden) } (** val qmult : q -> q -> q **) let qmult x y = { qnum = (zmult x.qnum y.qnum); qden = (pmult x.qden y.qden) } (** val qopp : q -> q **) let qopp x = { qnum = (zopp x.qnum); qden = x.qden } (** val qminus : q -> q -> q **) let qminus x y = qplus x (qopp y) type 'a t = | Empty | Leaf of 'a | Node of 'a t * 'a * 'a t (** val find : 'a1 -> 'a1 t -> positive -> 'a1 **) let rec find default vm p = match vm with | Empty -> default | Leaf i -> i | Node (l, e, r) -> (match p with | XI p2 -> find default r p2 | XO p2 -> find default l p2 | XH -> e) type zWitness = z coneMember (** val zWeakChecker : z nFormula list -> z coneMember -> bool **) let zWeakChecker x x0 = check_normalised_formulas Z0 (Zpos XH) zplus zmult zminus zopp zeq_bool zle_bool x x0 (** val xnormalise0 : z formula -> z nFormula list **) let xnormalise0 t0 = let { flhs = lhs; fop = o; frhs = rhs } = t0 in (match o with | OpEq -> Cons ((Pair ((PEsub (lhs, (PEadd (rhs, (PEc (Zpos XH)))))), NonStrict)), (Cons ((Pair ((PEsub (rhs, (PEadd (lhs, (PEc (Zpos XH)))))), NonStrict)), Nil))) | OpNEq -> Cons ((Pair ((PEsub (lhs, rhs)), Equal)), Nil) | OpLe -> Cons ((Pair ((PEsub (lhs, (PEadd (rhs, (PEc (Zpos XH)))))), NonStrict)), Nil) | OpGe -> Cons ((Pair ((PEsub (rhs, (PEadd (lhs, (PEc (Zpos XH)))))), NonStrict)), Nil) | OpLt -> Cons ((Pair ((PEsub (lhs, rhs)), NonStrict)), Nil) | OpGt -> Cons ((Pair ((PEsub (rhs, lhs)), NonStrict)), Nil)) (** val normalise : z formula -> z nFormula cnf **) let normalise t0 = map (fun x -> Cons (x, Nil)) (xnormalise0 t0) (** val xnegate0 : z formula -> z nFormula list **) let xnegate0 t0 = let { flhs = lhs; fop = o; frhs = rhs } = t0 in (match o with | OpEq -> Cons ((Pair ((PEsub (lhs, rhs)), Equal)), Nil) | OpNEq -> Cons ((Pair ((PEsub (lhs, (PEadd (rhs, (PEc (Zpos XH)))))), NonStrict)), (Cons ((Pair ((PEsub (rhs, (PEadd (lhs, (PEc (Zpos XH)))))), NonStrict)), Nil))) | OpLe -> Cons ((Pair ((PEsub (rhs, lhs)), NonStrict)), Nil) | OpGe -> Cons ((Pair ((PEsub (lhs, rhs)), NonStrict)), Nil) | OpLt -> Cons ((Pair ((PEsub (rhs, (PEadd (lhs, (PEc (Zpos XH)))))), NonStrict)), Nil) | OpGt -> Cons ((Pair ((PEsub (lhs, (PEadd (rhs, (PEc (Zpos XH)))))), NonStrict)), Nil)) (** val negate : z formula -> z nFormula cnf **) let negate t0 = map (fun x -> Cons (x, Nil)) (xnegate0 t0) (** val ceiling : z -> z -> z **) let ceiling a b = let Pair (q0, r) = zdiv_eucl a b in (match r with | Z0 -> q0 | _ -> zplus q0 (Zpos XH)) type proofTerm = | RatProof of zWitness | CutProof of z pExprC * q * zWitness * proofTerm | EnumProof of q * z pExprC * q * zWitness * zWitness * proofTerm list (** val makeLb : z pExpr -> q -> z nFormula **) let makeLb v q0 = let { qnum = n0; qden = d } = q0 in Pair ((PEsub ((PEmul ((PEc (Zpos d)), v)), (PEc n0))), NonStrict) (** val qceiling : q -> z **) let qceiling q0 = let { qnum = n0; qden = d } = q0 in ceiling n0 (Zpos d) (** val makeLbCut : z pExprC -> q -> z nFormula **) let makeLbCut v q0 = Pair ((PEsub (v, (PEc (qceiling q0)))), NonStrict) (** val neg_nformula : z nFormula -> (z pExpr, op1) prod **) let neg_nformula = function | Pair (e, o) -> Pair ((PEopp (PEadd (e, (PEc (Zpos XH))))), o) (** val cutChecker : z nFormula list -> z pExpr -> q -> zWitness -> z nFormula option **) let cutChecker l e lb pf = match zWeakChecker (Cons ((neg_nformula (makeLb e lb)), l)) pf with | True -> Some (makeLbCut e lb) | False -> None (** val zChecker : z nFormula list -> proofTerm -> bool **) let rec zChecker l = function | RatProof pf0 -> zWeakChecker l pf0 | CutProof (e, q0, pf0, rst) -> (match cutChecker l e q0 pf0 with | Some c -> zChecker (Cons (c, l)) rst | None -> False) | EnumProof (lb, e, ub, pf1, pf2, rst) -> (match cutChecker l e lb pf1 with | Some n0 -> (match cutChecker l (PEopp e) (qopp ub) pf2 with | Some n1 -> let rec label pfs lb0 ub0 = match pfs with | Nil -> (match z_gt_dec lb0 ub0 with | Left -> True | Right -> False) | Cons (pf0, rsr) -> (match zChecker (Cons ((Pair ((PEsub (e, (PEc lb0))), Equal)), l)) pf0 with | True -> label rsr (zplus lb0 (Zpos XH)) ub0 | False -> False) in label rst (qceiling lb) (zopp (qceiling (qopp ub))) | None -> False) | None -> False) (** val zTautoChecker : z formula bFormula -> proofTerm list -> bool **) let zTautoChecker f w = tauto_checker normalise negate zChecker f w (** val map_cone : (nat -> nat) -> zWitness -> zWitness **) let rec map_cone f e = match e with | S_In n0 -> S_In (f n0) | S_Ideal (e0, cm) -> S_Ideal (e0, (map_cone f cm)) | S_Monoid l -> S_Monoid (map f l) | S_Mult (cm1, cm2) -> S_Mult ((map_cone f cm1), (map_cone f cm2)) | S_Add (cm1, cm2) -> S_Add ((map_cone f cm1), (map_cone f cm2)) | _ -> e (** val indexes : zWitness -> nat list **) let rec indexes = function | S_In n0 -> Cons (n0, Nil) | S_Ideal (e0, cm) -> indexes cm | S_Monoid l -> l | S_Mult (cm1, cm2) -> app (indexes cm1) (indexes cm2) | S_Add (cm1, cm2) -> app (indexes cm1) (indexes cm2) | _ -> Nil (** val n_of_Z : z -> n **) let n_of_Z = function | Zpos p -> Npos p | _ -> N0 (** val qeq_bool : q -> q -> bool **) let qeq_bool p q0 = zeq_bool (zmult p.qnum (Zpos q0.qden)) (zmult q0.qnum (Zpos p.qden)) (** val qle_bool : q -> q -> bool **) let qle_bool x y = zle_bool (zmult x.qnum (Zpos y.qden)) (zmult y.qnum (Zpos x.qden)) type qWitness = q coneMember (** val qWeakChecker : q nFormula list -> q coneMember -> bool **) let qWeakChecker x x0 = check_normalised_formulas { qnum = Z0; qden = XH } { qnum = (Zpos XH); qden = XH } qplus qmult qminus qopp qeq_bool qle_bool x x0 (** val qTautoChecker : q formula bFormula -> qWitness list -> bool **) let qTautoChecker f w = tauto_checker (fun x -> cnf_normalise x) (fun x -> cnf_negate x) qWeakChecker f w