X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=blobdiff_plain;f=matita%2Fcontribs%2Flibrary_auto%2Fauto%2Fnat%2Fsigma_and_pi.ma;fp=matita%2Fcontribs%2Flibrary_auto%2Fauto%2Fnat%2Fsigma_and_pi.ma;h=2bf73d4c3c7e6412bed335859362612da4c23145;hp=0000000000000000000000000000000000000000;hb=f61af501fb4608cc4fb062a0864c774e677f0d76;hpb=58ae1809c352e71e7b5530dc41e2bfc834e1aef1 diff --git a/matita/contribs/library_auto/auto/nat/sigma_and_pi.ma b/matita/contribs/library_auto/auto/nat/sigma_and_pi.ma new file mode 100644 index 000000000..2bf73d4c3 --- /dev/null +++ b/matita/contribs/library_auto/auto/nat/sigma_and_pi.ma @@ -0,0 +1,139 @@ +(**************************************************************************) +(* ___ *) +(* ||M|| *) +(* ||A|| A project by Andrea Asperti *) +(* ||T|| *) +(* ||I|| Developers: *) +(* ||T|| A.Asperti, C.Sacerdoti Coen, *) +(* ||A|| E.Tassi, S.Zacchiroli *) +(* \ / *) +(* \ / Matita is distributed under the terms of the *) +(* v GNU Lesser General Public License Version 2.1 *) +(* *) +(**************************************************************************) + +set "baseuri" "cic:/matita/library_autobatch/nat/sigma_and_pi". + +include "auto/nat/factorial.ma". +include "auto/nat/exp.ma". +include "auto/nat/lt_arith.ma". + +let rec sigma n f m \def + match n with + [ O \Rightarrow (f m) + | (S p) \Rightarrow (f (S p+m))+(sigma p f m)]. + +let rec pi n f m \def + match n with + [ O \Rightarrow f m + | (S p) \Rightarrow (f (S p+m))*(pi p f m)]. + +theorem eq_sigma: \forall f,g:nat \to nat. +\forall n,m:nat. +(\forall i:nat. m \le i \to i \le m+n \to f i = g i) \to +(sigma n f m) = (sigma n g m). +intros 3. +elim n +[ simplify. + autobatch + (*apply H + [ apply le_n + | rewrite < plus_n_O. + apply le_n + ]*) +| simplify. + apply eq_f2 + [ apply H1 + [ autobatch + (*change with (m \le (S n1)+m). + apply le_plus_n*) + | autobatch + (*rewrite > (sym_plus m). + apply le_n*) + ] + | apply H. + intros. + apply H1 + [ assumption + | autobatch + (*rewrite < plus_n_Sm. + apply le_S. + assumption*) + ] + ] +] +qed. + +theorem eq_pi: \forall f,g:nat \to nat. +\forall n,m:nat. +(\forall i:nat. m \le i \to i \le m+n \to f i = g i) \to +(pi n f m) = (pi n g m). +intros 3. +elim n +[ simplify. + autobatch + (*apply H + [ apply le_n + | rewrite < plus_n_O. + apply le_n + ] *) +| simplify. + apply eq_f2 + [ apply H1 + [ autobatch + (*change with (m \le (S n1)+m). + apply le_plus_n*) + | autobatch + (*rewrite > (sym_plus m). + apply le_n*) + ] + | apply H. + intros. + apply H1 + [ assumption + | autobatch + (*rewrite < plus_n_Sm. + apply le_S. + assumption*) + ] + ] +] +qed. + +theorem eq_fact_pi: \forall n. (S n)! = pi n (\lambda m.m) (S O). +intro. +elim n +[ autobatch + (*simplify. + reflexivity*) +| change with ((S(S n1))*(S n1)! = ((S n1)+(S O))*(pi n1 (\lambda m.m) (S O))). + rewrite < plus_n_Sm. + rewrite < plus_n_O. + autobatch + (*apply eq_f. + assumption*) +] +qed. + +theorem exp_pi_l: \forall f:nat\to nat.\forall n,m,a:nat. +(exp a (S n))*pi n f m= pi n (\lambda p.a*(f p)) m. +intros. +elim n +[ autobatch + (*simplify. + rewrite < times_n_SO. + reflexivity*) +| simplify. + rewrite < H. + rewrite > assoc_times. + rewrite > assoc_times in\vdash (? ? ? %). + apply eq_f. + rewrite < assoc_times. + rewrite < assoc_times. + autobatch + (*apply eq_f2 + [ apply sym_times + | reflexivity + ]*) +] +qed.