X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fmatita%2Flibrary%2Fnat%2Fpi_p.ma;h=0c5e0d7014bda9cfcc98fb061738499b726d5211;hb=bccbeb1ec0ef3b55625e4434e693db3cce2e69be;hp=e649f5f193ecdda0b0d9e7fc0c54b0d7355a233c;hpb=6db38e3d8e4083765f2fce40c7845c9827b9afd0;p=helm.git diff --git a/helm/software/matita/library/nat/pi_p.ma b/helm/software/matita/library/nat/pi_p.ma index e649f5f19..0c5e0d701 100644 --- a/helm/software/matita/library/nat/pi_p.ma +++ b/helm/software/matita/library/nat/pi_p.ma @@ -12,8 +12,6 @@ (* *) (**************************************************************************) -set "baseuri" "cic:/matita/nat/pi_p". - include "nat/primes.ma". (* include "nat/ord.ma". *) include "nat/generic_iter_p.ma". @@ -200,17 +198,16 @@ theorem le_pi_p: (\forall i. i < n \to p i = true \to g1 i \le g2 i ) \to pi_p n p g1 \le pi_p n p g2. intros. -generalize in match H. -elim n +elim n in H ⊢ % [apply le_n. |apply (bool_elim ? (p n1));intros [rewrite > true_to_pi_p_Sn [rewrite > true_to_pi_p_Sn in ⊢ (? ? %) [apply le_times - [apply H2[apply le_n|assumption] - |apply H1. + [apply H1[apply le_n|assumption] + |apply H. intros. - apply H2[apply le_S.assumption|assumption] + apply H1[apply le_S.assumption|assumption] ] |assumption ] @@ -218,9 +215,9 @@ elim n ] |rewrite > false_to_pi_p_Sn [rewrite > false_to_pi_p_Sn in ⊢ (? ? %) - [apply H1. + [apply H. intros. - apply H2[apply le_S.assumption|assumption] + apply H1[apply le_S.assumption|assumption] |assumption ] |assumption @@ -257,6 +254,35 @@ elim n ] qed. +theorem exp_sigma_p1: \forall n,a,p,f. +pi_p n p (\lambda x.(exp a (f x))) = (exp a (sigma_p n p f)). +intros. +elim n + [reflexivity + |apply (bool_elim ? (p n1)) + [intro. + rewrite > true_to_pi_p_Sn + [rewrite > true_to_sigma_p_Sn + [simplify. + rewrite > H. + rewrite > exp_plus_times. + reflexivity. + |assumption + ] + |assumption + ] + |intro. + rewrite > false_to_pi_p_Sn + [rewrite > false_to_sigma_p_Sn + [simplify.assumption + |assumption + ] + |assumption + ] + ] + ] +qed. + theorem times_pi_p: \forall n,p,f,g. pi_p n p (\lambda x.f x*g x) = pi_p n p f * pi_p n p g. intros.