From 825fcd9784570617b610d7cb0308984a19f7ba87 Mon Sep 17 00:00:00 2001 From: Enrico Tassi Date: Thu, 11 Feb 2010 10:34:32 +0000 Subject: [PATCH] minimal sequent height set to 1 --- helm/software/components/ng_tactics/nnAuto.ml | 2 +- helm/software/matita/nlibrary/arithmetics/nat.ma | 16 ++++++++-------- 2 files changed, 9 insertions(+), 9 deletions(-) diff --git a/helm/software/components/ng_tactics/nnAuto.ml b/helm/software/components/ng_tactics/nnAuto.ml index 0d8655f54..e6010808b 100644 --- a/helm/software/components/ng_tactics/nnAuto.ml +++ b/helm/software/components/ng_tactics/nnAuto.ml @@ -1448,7 +1448,7 @@ let fast_height_of_term t = let height_of_goals status = let open_goals = head_goals status#stack in assert (List.length open_goals > 0); - let h = ref 0 in + let h = ref 1 in List.iter (fun open_goal -> let ty = get_goalty status open_goal in diff --git a/helm/software/matita/nlibrary/arithmetics/nat.ma b/helm/software/matita/nlibrary/arithmetics/nat.ma index 393f16189..a163960f7 100644 --- a/helm/software/matita/nlibrary/arithmetics/nat.ma +++ b/helm/software/matita/nlibrary/arithmetics/nat.ma @@ -840,7 +840,7 @@ ntheorem minus_Sn_m: ∀m,n:nat. m ≤ n → S n -m = S (n-m). #n; #m; #lenm; nelim lenm; napplyS refl_eq. *) napply nat_elim2; ##[// - ##|#n; #abs; napply False_ind; (* XXX *) napply not_le_Sn_O; /2/. + ##|#n; #abs; napply False_ind; /2/. ##|#n; #m; #Hind; #c; napplyS Hind; /2/; ##] nqed. @@ -859,7 +859,7 @@ ntheorem plus_minus: ∀m,n,p:nat. m ≤ n → (n-m)+p = (n+p)-m. napply nat_elim2; ##[// - ##|#n; #p; #abs; napply False_ind; (* XXX *) napply not_le_Sn_O; /2/; + ##|#n; #p; #abs; napply False_ind; /2/; ##|nnormalize;/3/; ##] nqed. @@ -1031,9 +1031,9 @@ ntheorem eqb_elim : ∀ n,m:nat.∀ P:bool → Prop. (n=m → (P true)) → (n ≠ m → (P false)) → (P (eqb n m)). napply nat_elim2; ##[#n; ncases n; nnormalize; /3/; - ##|nnormalize; (* XXX *) nletin hint ≝ not_eq_O_S; /3/; + ##|nnormalize; /3/; ##|nnormalize; /4/; - ##] (* XXX rimane aperto *) #m; #P; #_; #H; napply H; napply not_eq_O_S. + ##] nqed. ntheorem eqb_n_n: ∀n. eqb n n = true. @@ -1042,7 +1042,7 @@ nqed. ntheorem eqb_true_to_eq: ∀n,m:nat. eqb n m = true → n = m. #n; #m; napply (eqb_elim n m);//; -#_; #abs; napply False_ind; (* XXX *) nletin hint ≝ not_eq_true_false; /2/; +#_; #abs; napply False_ind; /2/; nqed. ntheorem eqb_false_to_not_eq: ∀n,m:nat. eqb n m = false → n ≠ m. @@ -1072,7 +1072,7 @@ ntheorem leb_elim: ∀n,m:nat. ∀P:bool → Prop. (n ≤ m → P true) → (n ≰ m → P false) → P (leb n m). napply nat_elim2; nnormalize; ##[/2/ - ##| (* XXX *) nletin hint ≝ not_le_Sn_O; /3/; + ##| /3/; ##|#n; #m; #Hind; #P; #Pt; #Pf; napply Hind; ##[#lenm; napply Pt; napply le_S_S;//; ##|#nlenm; napply Pf; #leSS; /3/; @@ -1083,14 +1083,14 @@ nqed. ntheorem leb_true_to_le:∀n,m.leb n m = true → n ≤ m. #n; #m; napply leb_elim; ##[//; - ##|#_; #abs; napply False_ind; (* XXX *) nletin hint ≝ not_eq_true_false; /2/; + ##|#_; #abs; napply False_ind; /2/; ##] nqed. ntheorem leb_false_to_not_le:∀n,m. leb n m = false → n ≰ m. #n; #m; napply leb_elim; - ##[#_; #abs; napply False_ind; (* XXX *) nletin hint ≝ not_eq_true_false; /2/; + ##[#_; #abs; napply False_ind; /2/; ##|/2/; ##] nqed. -- 2.39.2