X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Flibrary%2Fnat%2Fmap_iter_p.ma;fp=matita%2Flibrary%2Fnat%2Fmap_iter_p.ma;h=ff48d4d061141c9f7a84bf642e04c7aa55ac2408;hp=0000000000000000000000000000000000000000;hb=f61af501fb4608cc4fb062a0864c774e677f0d76;hpb=58ae1809c352e71e7b5530dc41e2bfc834e1aef1 diff --git a/matita/library/nat/map_iter_p.ma b/matita/library/nat/map_iter_p.ma new file mode 100644 index 000000000..ff48d4d06 --- /dev/null +++ b/matita/library/nat/map_iter_p.ma @@ -0,0 +1,868 @@ +(**************************************************************************) +(* ___ *) +(* ||M|| *) +(* ||A|| A project by Andrea Asperti *) +(* ||T|| *) +(* ||I|| Developers: *) +(* ||T|| A.Asperti, C.Sacerdoti Coen, *) +(* ||A|| E.Tassi, S.Zacchiroli *) +(* \ / *) +(* \ / This file is distributed under the terms of the *) +(* v GNU Lesser General Public License Version 2.1 *) +(* *) +(**************************************************************************) + +include "nat/permutation.ma". +include "nat/count.ma". + +let rec map_iter_p n p (g:nat \to nat) (a:nat) f \def + match n with + [ O \Rightarrow a + | (S k) \Rightarrow + match p (S k) with + [true \Rightarrow f (g (S k)) (map_iter_p k p g a f) + |false \Rightarrow map_iter_p k p g a f] + ]. + +theorem eq_map_iter_p: \forall g1,g2:nat \to nat. +\forall p:nat \to bool. +\forall f:nat \to nat \to nat. \forall a,n:nat. +(\forall m:nat. m \le n \to g1 m = g2 m) \to +map_iter_p n p g1 a f = map_iter_p n p g2 a f. +intros 6.elim n + [simplify.reflexivity. + |simplify.elim (p (S n1)) + [simplify.apply eq_f2 + [apply H1.apply le_n + |simplify.apply H.intros.apply H1. + apply le_S.assumption + ] + |simplify.apply H.intros.apply H1. + apply le_S.assumption + ] + ] +qed. + +(* useful since simplify simpifies too much *) + +theorem map_iter_p_O: \forall p.\forall g.\forall f. \forall a:nat. +map_iter_p O p g a f = a. +intros.simplify.reflexivity. +qed. + +theorem map_iter_p_S_true: \forall p.\forall g.\forall f. \forall a,n:nat. +p (S n) = true \to +map_iter_p (S n) p g a f = f (g (S n)) (map_iter_p n p g a f). +intros.simplify.rewrite > H.reflexivity. +qed. + +theorem map_iter_p_S_false: \forall p.\forall g.\forall f. \forall a,n:nat. +p (S n) = false \to +map_iter_p (S n) p g a f = map_iter_p n p g a f. +intros.simplify.rewrite > H.reflexivity. +qed. + +(* map_iter examples *) +definition pi_p \def \lambda p. \lambda n. +map_iter_p n p (\lambda n.n) (S O) times. + +lemma pi_p_S: \forall n.\forall p. +pi_p p (S n) = + match p (S n) with + [true \Rightarrow (S n)*(pi_p p n) + |false \Rightarrow (pi_p p n) + ]. +intros.reflexivity. +qed. + +lemma lt_O_pi_p: \forall n.\forall p. +O < pi_p p n. +intros.elim n + [simplify.apply le_n + |rewrite > pi_p_S. + elim p (S n1) + [change with (O < (S n1)*(pi_p p n1)). + rewrite >(times_n_O n1). + apply lt_times[apply le_n|assumption] + | assumption + ] + ] +qed. + +let rec card n p \def + match n with + [O \Rightarrow O + |(S m) \Rightarrow + (bool_to_nat (p (S m))) + (card m p)]. + +lemma count_card: \forall p.\forall n. +p O = false \to count (S n) p = card n p. +intros.elim n + [simplify.rewrite > H. reflexivity + |simplify. + rewrite < plus_n_O. + apply eq_f.assumption + ] +qed. + +lemma count_card1: \forall p.\forall n. +p O = false \to p n = false \to count n p = card n p. +intros 3.apply (nat_case n) + [intro.simplify.rewrite > H. reflexivity + |intros.rewrite > (count_card ? ? H). + simplify.rewrite > H1.reflexivity + ] +qed. + +lemma a_times_pi_p: \forall p. \forall a,n. +exp a (card n p) * pi_p p n = map_iter_p n p (\lambda n.a*n) (S O) times. +intros.elim n + [simplify.reflexivity + |simplify.apply (bool_elim ? (p (S n1))) + [intro. + change with + (a*exp a (card n1 p) * ((S n1) * (pi_p p n1)) = + a*(S n1)*map_iter_p n1 p (\lambda n.a*n) (S O) times). + rewrite < H. + autobatch + |intro.assumption + ] + ] +qed. + +definition permut_p \def \lambda f. \lambda p:nat\to bool. \lambda n. +\forall i. i \le n \to p i = true \to ((f i \le n \land p (f i) = true) +\land (\forall j. p j = true \to j \le n \to i \neq j \to (f i \neq f j))). + +definition extentional_eq_n \def \lambda f,g:nat \to nat.\lambda n. +\forall x. x \le n \to f x = g x. + +lemma extentional_eq_n_to_permut_p: \forall f,g. \forall p. \forall n. +extentional_eq_n f g n\to permut_p f p n \to permut_p g p n. +intros.unfold permut_p. +intros. +elim (H1 i H2 H3). +split + [elim H4.split + [rewrite < (H i H2).assumption + |rewrite < (H i H2).assumption + ] + |intros. + unfold.intro.apply (H5 j H6 H7 H8). + rewrite > (H i H2). + rewrite > (H j H7).assumption + ] +qed. + +theorem permut_p_compose: \forall f,g.\forall p.\forall n. +permut_p f p n \to permut_p g p n \to permut_p (compose ? ? ? g f) p n. +intros.unfold permut_p.intros. +elim (H i H2 H3). +elim H4. +elim (H1 (f i) H6 H7). +elim H8. +split + [split + [unfold compose.assumption + |unfold compose.rewrite < H11.reflexivity + ] + |intros. + unfold compose. + apply (H9 (f j)) + [elim (H j H13 H12).elim H15.rewrite < H18.reflexivity + |elim (H j H13 H12).elim H15.assumption. + |apply (H5 j H12 H13 H14) + ] + ] +qed. + +theorem permut_p_S_to_permut_p: \forall f.\forall p.\forall n. +permut_p f p (S n) \to (f (S n)) = (S n) \to permut_p f p n. +intros. +unfold permut_p. +intros. +split + [elim (H i (le_S i n H2) H3).split + [elim H4. + elim (le_to_or_lt_eq (f i) (S n)) + [apply le_S_S_to_le.assumption + |absurd (f i = (S n)) + [assumption + |rewrite < H1. + apply H5 + [rewrite < H8.assumption + |apply le_n + |unfold.intro. + apply (not_le_Sn_n n).rewrite < H9.assumption + ] + ] + |assumption + ] + |elim H4.assumption + ] + |intros. + elim (H i (le_S i n H2) H3). + apply H8 + [assumption|apply le_S.assumption|assumption] + ] +qed. + +lemma permut_p_transpose: \forall p.\forall i,j,n. +i \le n \to j \le n \to p i = p j \to +permut_p (transpose i j) p n. +unfold permut_p.intros. +split + [split + [unfold transpose. + apply (eqb_elim i1 i) + [intro. + apply (eqb_elim i1 j) + [simplify.intro.assumption + |simplify.intro.assumption + ] + |intro. + apply (eqb_elim i1 j) + [simplify.intro.assumption + |simplify.intro.assumption + ] + ] + |unfold transpose. + apply (eqb_elim i1 i) + [intro. + apply (eqb_elim i1 j) + [simplify.intro.rewrite < H6.assumption + |simplify.intro.rewrite < H2.rewrite < H5.assumption + ] + |intro. + apply (eqb_elim i1 j) + [simplify.intro.rewrite > H2.rewrite < H6.assumption + |simplify.intro.assumption + ] + ] + ] + |intros.unfold Not. + intro.apply H7. + apply (injective_transpose ? ? ? ? H8). + ] +qed. + +theorem eq_map_iter_p_k: \forall f,g.\forall p.\forall a,k,n:nat. +p (S n-k) = true \to (\forall i. (S n)-k < i \to i \le (S n) \to (p i) = false) \to +map_iter_p (S n) p g a f = map_iter_p (S n-k) p g a f. +intros 5. +elim k 3 + [rewrite < minus_n_O.reflexivity + |apply (nat_case n1) + [intros. + rewrite > map_iter_p_S_false + [reflexivity + |apply H2[simplify.apply lt_O_S.|apply le_n] + ] + |intros. + rewrite > map_iter_p_S_false + [rewrite > (H m H1) + [reflexivity + |intros. + apply (H2 i H3). + apply le_S. + assumption + ] + |apply H2[autobatch|apply le_n] + ] + ] + ] +qed. + +theorem eq_map_iter_p_a: \forall p.\forall f.\forall g. \forall a,n:nat. +(\forall i.i \le n \to p i = false) \to map_iter_p n p g a f = a. +intros 5. +elim n + [simplify.reflexivity + |rewrite > map_iter_p_S_false + [apply H. + intros. + apply H1.apply le_S.assumption + |apply H1.apply le_n + ] + ] +qed. + +theorem eq_map_iter_p_transpose: \forall p.\forall f.associative nat f \to +symmetric2 nat nat f \to \forall g. \forall a,k,n:nat. k < n \to +(p (S n) = true) \to (p (n-k)) = true \to (\forall i. n-k < i \to i \le n \to (p i) = false) +\to map_iter_p (S n) p g a f = map_iter_p (S n) p (\lambda m. g (transpose (n-k) (S n) m)) a f. +intros 8. +apply (nat_case n) + [intro.absurd (k < O) + [assumption|apply le_to_not_lt.apply le_O_n] + |intros. + rewrite > (map_iter_p_S_true ? ? ? ? ? H3). + rewrite > (map_iter_p_S_true ? ? ? ? ? H3). + rewrite > (eq_map_iter_p_k ? ? ? ? ? ? H4 H5). + rewrite > (eq_map_iter_p_k ? ? ? ? ? ? H4 H5). + generalize in match H4. + rewrite > minus_Sn_m + [intro. + rewrite > (map_iter_p_S_true ? ? ? ? ? H6). + rewrite > (map_iter_p_S_true ? ? ? ? ? H6). + rewrite > transpose_i_j_j. + rewrite > transpose_i_j_i. + cut (map_iter_p (m-k) p g a f = + map_iter_p (m-k) p (\lambda x.g (transpose (S(m-k)) (S(S m)) x)) a f) + [rewrite < Hcut. + rewrite < H. + rewrite < H1 in \vdash (? ? (? % ?) ?). + rewrite > H. + reflexivity + |apply eq_map_iter_p. + intros.unfold transpose. + cut (eqb m1 (S (m-k)) =false) + [cut (eqb m1 (S (S m)) =false) + [rewrite > Hcut. + rewrite > Hcut1. + reflexivity + |apply not_eq_to_eqb_false. + apply lt_to_not_eq. + apply (le_to_lt_to_lt ? m) + [apply (trans_le ? (m-k)) + [assumption|autobatch] + |apply le_S.apply le_n + ] + ] + |apply not_eq_to_eqb_false. + apply lt_to_not_eq. + unfold.autobatch + ] + ] + |apply le_S_S_to_le.assumption + ] + ] +qed. + +theorem eq_map_iter_p_transpose1: \forall p.\forall f.associative nat f \to +symmetric2 nat nat f \to \forall g. \forall a,k1,k2,n:nat. O < k1 \to k1 < k2 \to k2 \le n \to +(p k1) = true \to (p k2) = true \to (\forall i. k1 < i \to i < k2 \to (p i) = false) +\to map_iter_p n p g a f = map_iter_p n p (\lambda m. g (transpose k1 k2 m)) a f. +intros 10. +elim n 2 + [absurd (k2 \le O) + [assumption|apply lt_to_not_le.apply (trans_lt ? k1 ? H2 H3)] + |apply (eqb_elim (S n1) k2) + [intro. + rewrite < H4. + intros. + cut (k1 = n1 - (n1 -k1)) + [rewrite > Hcut. + apply (eq_map_iter_p_transpose p f H H1 g a (n1-k1)) + [cut (k1 \le n1)[autobatch|autobatch] + |assumption + |rewrite < Hcut.assumption + |rewrite < Hcut.intros. + apply (H9 i H10).unfold.autobatch + ] + |apply sym_eq. + apply plus_to_minus. + autobatch. + ] + |intros. + cut ((S n1) \neq k1) + [apply (bool_elim ? (p (S n1))) + [intro. + rewrite > map_iter_p_S_true + [rewrite > map_iter_p_S_true + [cut ((transpose k1 k2 (S n1)) = (S n1)) + [rewrite > Hcut1. + apply eq_f. + apply (H3 H5) + [elim (le_to_or_lt_eq ? ? H6) + [autobatch + |absurd (S n1=k2)[apply sym_eq.assumption|assumption] + ] + |assumption + |assumption + |assumption + ] + |unfold transpose. + rewrite > (not_eq_to_eqb_false ? ? Hcut). + rewrite > (not_eq_to_eqb_false ? ? H4). + reflexivity + ] + |assumption + ] + |assumption + ] + |intro. + rewrite > map_iter_p_S_false + [rewrite > map_iter_p_S_false + [apply (H3 H5) + [elim (le_to_or_lt_eq ? ? H6) + [autobatch + |absurd (S n1=k2)[apply sym_eq.assumption|assumption] + ] + |assumption + |assumption + |assumption + ] + |assumption + ] + |assumption + ] + ] + |unfold.intro. + absurd (k1 < k2) + [assumption + |apply le_to_not_lt. + rewrite < H10. + assumption + ] + ] + ] + ] +qed. + +lemma decidable_n:\forall p.\forall n. +(\forall m. m \le n \to (p m) = false) \lor +(\exists m. m \le n \land (p m) = true \land +\forall i. m < i \to i \le n \to (p i) = false). +intros. +elim n + [apply (bool_elim ? (p O)) + [intro.right. + apply (ex_intro ? ? O). + split + [split[apply le_n|assumption] + |intros.absurd (O H4.assumption + ] + |right. + elim H1.elim H3.elim H4. + apply (ex_intro ? ? a). + split + [split[apply le_S.assumption|assumption] + |intros.elim (le_to_or_lt_eq i (S n1) H9) + [apply H5[assumption|apply le_S_S_to_le.assumption] + |rewrite > H10.assumption + ] + ] + ] + ] + ] +qed. + +lemma decidable_n1:\forall p.\forall n,j. j \le n \to (p j)=true \to +(\forall m. j < m \to m \le n \to (p m) = false) \lor +(\exists m. j < m \land m \le n \land (p m) = true \land +\forall i. m < i \to i \le n \to (p i) = false). +intros. +elim (decidable_n p n) + [absurd ((p j)=true) + [assumption + |unfold.intro. + apply not_eq_true_false. + rewrite < H3. + apply H2.assumption + ] + |elim H2.clear H2. + apply (nat_compare_elim j a) + [intro. + right. + apply (ex_intro ? ? a). + elim H3.clear H3. + elim H4.clear H4. + split + [split + [split + [assumption|assumption] + |assumption + ] + |assumption + ] + |intro. + rewrite > H2. + left. + elim H3 2.assumption + |intro. + absurd (p j = true) + [assumption + |unfold.intro. + apply not_eq_true_false. + rewrite < H4. + elim H3.clear H3. + apply (H6 j H2).assumption + ] + ] + ] +qed. + +lemma decidable_n2:\forall p.\forall n,j. j \le n \to (p j)=true \to +(\forall m. j < m \to m \le n \to (p m) = false) \lor +(\exists m. j < m \land m \le n \land (p m) = true \land +\forall i. j < i \to i < m \to (p i) = false). +intros 3. +elim n + [left. + apply (le_n_O_elim j H).intros. + absurd (m \le O) + [assumption|apply lt_to_not_le.assumption] + |elim (le_to_or_lt_eq ? ? H1) + [cut (j \le n1) + [elim (H Hcut H2) + [apply (bool_elim ? (p (S n1))) + [intro. + right. + apply (ex_intro ? ? (S n1)). + split + [split + [split + [assumption|apply le_n] + |assumption + ] + |intros. + apply (H4 i H6). + apply le_S_S_to_le. + assumption + ] + |intro. + left. + intros. + elim (le_to_or_lt_eq ? ? H7) + [apply H4 + [assumption|apply le_S_S_to_le.assumption] + |rewrite > H8.assumption + ] + ] + |right. + elim H4.clear H4. + elim H5.clear H5. + elim H4.clear H4. + elim H5.clear H5. + apply (ex_intro ? ? a). + split + [split + [split[assumption|apply le_S.assumption] + |assumption + ] + |assumption + ] + ] + |apply le_S_S_to_le. + assumption + ] + |left. + intros. + absurd (j < m) + [assumption + |apply le_to_not_lt. + rewrite > H3. + assumption + ] + ] + ] +qed. + +theorem eq_map_iter_p_transpose2: \forall p.\forall f.associative nat f \to +symmetric2 nat nat f \to \forall g. \forall a,k,n:nat. O < k \to k \le n \to +(p (S n) = true) \to (p k) = true +\to map_iter_p (S n) p g a f = map_iter_p (S n) p (\lambda m. g (transpose k (S n) m)) a f. +intros 10. +cut (k = (S n)-(S n -k)) + [generalize in match H3.clear H3. + generalize in match g. + generalize in match H2.clear H2. + rewrite > Hcut. + (*generalize in match Hcut.clear Hcut.*) + (* generalize in match H3.clear H3.*) + (* something wrong here + rewrite > Hcut in \vdash (?\rarr ?\rarr %). *) + apply (nat_elim1 (S n - k)). + intros. + elim (decidable_n2 p n (S n -m) H4 H6) + [apply (eq_map_iter_p_transpose1 p f H H1 f1 a) + [assumption. + |unfold.autobatch. + |apply le_n + |assumption + |assumption + |intros.apply H7 + [assumption|apply le_S_S_to_le.assumption] + ] + |elim H7.clear H7. + elim H8.clear H8. + elim H7.clear H7. + elim H8.clear H8. + apply (trans_eq ? ? + (map_iter_p (S n) p (\lambda i.f1 (transpose a1 (S n) (transpose (S n -m) a1 i))) a f)) + [apply (trans_eq ? ? + (map_iter_p (S n) p (\lambda i.f1 (transpose a1 (S n) i)) a f)) + [cut (a1 = (S n -(S n -a1))) + [rewrite > Hcut1. + apply H2 + [apply lt_plus_to_lt_minus + [apply le_S.assumption + |rewrite < sym_plus. + apply lt_minus_to_lt_plus. + assumption + ] + |rewrite < Hcut1. + apply (trans_lt ? (S n -m))[assumption|assumption] + |rewrite < Hcut1.assumption + |assumption + |rewrite < Hcut1.assumption + ] + |apply minus_m_minus_mn. + apply le_S.assumption + ] + |apply (eq_map_iter_p_transpose1 p f H H1) + [assumption + |assumption + |apply le_S.assumption + |assumption + |assumption + |assumption + ] + ] + |apply (trans_eq ? ? + (map_iter_p (S n) p (\lambda i.f1 (transpose a1 (S n) (transpose (S n -m) a1 (transpose (S n -(S n -a1)) (S n) i)))) a f)) + [cut (a1 = (S n) -(S n -a1)) + [apply H2 + [apply lt_plus_to_lt_minus + [apply le_S.assumption + |rewrite < sym_plus. + apply lt_minus_to_lt_plus. + assumption + ] + |rewrite < Hcut1. + apply (trans_lt ? (S n -m))[assumption|assumption] + |rewrite < Hcut1.assumption + |assumption + |rewrite < Hcut1.assumption + ] + |apply minus_m_minus_mn. + apply le_S.assumption + ] + |apply eq_map_iter_p. + cut (a1 = (S n) -(S n -a1)) + [intros. + apply eq_f. + rewrite < Hcut1. + rewrite < transpose_i_j_j_i. + rewrite > (transpose_i_j_j_i (S n -m)). + rewrite > (transpose_i_j_j_i a1 (S n)). + rewrite > (transpose_i_j_j_i (S n -m)). + apply sym_eq. + apply eq_transpose + [unfold.intro. + apply (not_le_Sn_n n). + rewrite < H12.assumption + |unfold.intro. + apply (not_le_Sn_n n). + rewrite > H12.assumption + |unfold.intro. + apply (not_le_Sn_n a1). + rewrite < H12 in \vdash (? (? %) ?).assumption + ] + |apply minus_m_minus_mn. + apply le_S.assumption + ] + ] + ] + ] + |apply minus_m_minus_mn. + apply le_S.assumption + ] +qed. + +theorem eq_map_iter_p_transpose3: \forall p.\forall f.associative nat f \to +symmetric2 nat nat f \to \forall g. \forall a,k,n:nat. O < k \to k \le (S n) \to +(p (S n) = true) \to (p k) = true +\to map_iter_p (S n) p g a f = map_iter_p (S n) p (\lambda m. g (transpose k (S n) m)) a f. +intros. +elim (le_to_or_lt_eq ? ? H3) + [apply (eq_map_iter_p_transpose2 p f H H1 g a k n H2) + [apply le_S_S_to_le.assumption|assumption|assumption] + |rewrite > H6. + apply eq_map_iter_p. + intros. + apply eq_f.apply sym_eq. apply transpose_i_i. + ] +qed. + +lemma permut_p_O: \forall p.\forall h.\forall n. +permut_p h p n \to p O = false \to \forall m. (S m) \le n \to p (S m) = true \to O < h(S m). +intros.unfold permut_p in H. +apply not_le_to_lt.unfold.intro. +elim (H (S m) H2 H3). +elim H5. +absurd (p (h (S m)) = true) + [assumption + |apply (le_n_O_elim ? H4). + unfold.intro. + apply not_eq_true_false. + rewrite < H9.rewrite < H1.reflexivity + ] +qed. + +theorem eq_map_iter_p_permut: \forall p.\forall f.associative nat f \to +symmetric2 nat nat f \to \forall n.\forall g. \forall h.\forall a:nat. +permut_p h p n \to p O = false \to +map_iter_p n p g a f = map_iter_p n p (compose ? ? ? g h) a f . +intros 5. +elim n + [simplify.reflexivity + |apply (bool_elim ? (p (S n1))) + [intro. + apply (trans_eq ? ? (map_iter_p (S n1) p (\lambda m.g ((transpose (h (S n1)) (S n1)) m)) a f)) + [unfold permut_p in H3. + elim (H3 (S n1) (le_n ?) H5). + elim H6. clear H6. + apply (eq_map_iter_p_transpose3 p f H H1 g a (h(S n1)) n1) + [apply (permut_p_O ? ? ? H3 H4) + [apply le_n|assumption] + |assumption + |assumption + |assumption + ] + |apply (trans_eq ? ? (map_iter_p (S n1) p (\lambda m. + (g(transpose (h (S n1)) (S n1) + (transpose (h (S n1)) (S n1) (h m)))) ) a f)) + [rewrite > (map_iter_p_S_true ? ? ? ? ? H5). + rewrite > (map_iter_p_S_true ? ? ? ? ? H5). + apply eq_f2 + [rewrite > transpose_i_j_j. + rewrite > transpose_i_j_i. + rewrite > transpose_i_j_j. + reflexivity + |apply (H2 (\lambda m.(g(transpose (h (S n1)) (S n1) m))) ?) + [unfold.intros. + split + [split + [simplify. + unfold permut_p in H3. + elim (H3 i (le_S ? ? H6) H7). + elim H8. clear H8. + elim (le_to_or_lt_eq ? ? H10) + [unfold transpose. + rewrite > (not_eq_to_eqb_false ? ? (lt_to_not_eq ? ? H8)). + cut (h i \neq h (S n1)) + [rewrite > (not_eq_to_eqb_false ? ? Hcut). + simplify. + apply le_S_S_to_le. + assumption + |apply H9 + [apply H5 + |apply le_n + |apply lt_to_not_eq. + unfold.apply le_S_S.assumption + ] + ] + |rewrite > H8. + apply (eqb_elim (S n1) (h (S n1))) + [intro. + absurd (h i = h (S n1)) + [rewrite > H8. + assumption + |apply H9 + [assumption + |apply le_n + |apply lt_to_not_eq. + unfold.apply le_S_S.assumption + ] + ] + |intro. + unfold transpose. + rewrite > (not_eq_to_eqb_false ? ? H12). + rewrite > (eq_to_eqb_true ? ? (refl_eq ? (S n1))). + simplify. + elim (H3 (S n1) (le_n ? ) H5). + elim H13.clear H13. + elim (le_to_or_lt_eq ? ? H15) + [apply le_S_S_to_le.assumption + |apply False_ind. + apply H12. + apply sym_eq.assumption + ] + ] + ] + |simplify. + unfold permut_p in H3. + unfold transpose. + apply (eqb_elim (h i) (S n1)) + [intro. + apply (eqb_elim (h i) (h (S n1))) + [intro.simplify.assumption + |intro.simplify. + elim (H3 (S n1) (le_n ? ) H5). + elim H10. assumption + ] + |intro. + apply (eqb_elim (h i) (h (S n1))) + [intro.simplify.assumption + |intro.simplify. + elim (H3 i (le_S ? ? H6) H7). + elim H10. assumption + ] + ] + ] + |simplify.intros.unfold Not.intro. + unfold permut_p in H3. + elim (H3 i (le_S i ? H6) H7). + apply (H13 j H8 (le_S j ? H9) H10). + apply (injective_transpose ? ? ? ? H11) + ] + |assumption + ] + ] + |apply eq_map_iter_p. + intros. + rewrite > transpose_transpose.reflexivity + ] + ] + |intro. + rewrite > (map_iter_p_S_false ? ? ? ? ? H5). + rewrite > (map_iter_p_S_false ? ? ? ? ? H5). + apply H2 + [unfold permut_p. + unfold permut_p in H3. + intros. + elim (H3 i (le_S i ? H6) H7). + elim H8. + split + [split + [elim (le_to_or_lt_eq ? ? H10) + [apply le_S_S_to_le.assumption + |absurd (p (h i) = true) + [assumption + |rewrite > H12. + rewrite > H5. + unfold.intro.apply not_eq_true_false. + apply sym_eq.assumption + ] + ] + |assumption + ] + |intros. + apply H9 + [assumption|apply (le_S ? ? H13)|assumption] + ] + |assumption + ] + ] + ] +qed. +