for_examples : THEORY BEGIN IMPORTING for_iterate,%% a = 1; %% for (i=1; i <= n; i++) { %% a = a*x; %% } LAMBDA (i:subrange(1,n),a:real):a*x)LEMMA %% Proved using for_induction. %% Invariant is LAMBDA(i:upto(n),a:nat): a = x^i LEMMA FORALL (x:real,n:nat): expit(x,n) = x^n%% a = 1; %% for (i=n; i >= 1; i--) { %% a = a*i; %% } LAMBDA (i:subrange(1,n),a:nat):a*i)LEMMA %% Proved using for_down_induction. %% Invariant is LAMBDA(i:upto(n),a:nat): a = factorial(n)/factorial(n-i) LEMMA FORALL (n:nat): factit(n) = factorial(n)%% a = nth(l,0); %% for (i=1;i<=length(l)-1;i++) { %% a = max(a,nth(l,i)) %% } LAMBDA (i:below(length(l))):nth(l,i),max)LEMMA %% Proved using iterate_left_induction. %% Invariant is LAMBDA(n:below(length(l)),a:real):FORALL(k:upto(n)) : nth(l,k) <= a LEMMA FORALL (l:(cons?[real]),i:below(length(l))) :%% a = nth(l,0); %% for (i=1;i<=length(l)-1;i++) { %% a = min(nth(l,i),a) %% } LAMBDA (i:below(length(l))):nth(l,i),min)LEMMA %% Proved using iterate_right_induction. %% Invariant is LAMBDA(n:below(length(l)),a:real): LET ll = length(l)-1 IN %% FORALL(k:subrange(ll-n,ll)) :a <= nth(l,k) LEMMA FORALL (l:(cons?[real]),i:below(length(l))) :END for_examplesquality 95%
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