set S = Funcs F2(),INT ;
reconsider s1 = F6() . F9(),(F7() := F10()) as Element of Funcs F2(),INT ;
set C = F8() leq F7();
reconsider s2 = F6() . s1,(F8() leq F7()) as Element of Funcs F2(),INT ;
A6: P1[s2] by A2, A3;
defpred S1[ Element of Funcs F2(),INT ] means ( P1[$1] & ( F10() . F9() >= F9() . F8() implies ($1 . F7()) + 1 >= F9() . F8() ) & $1 . F8() = F9() . F8() );
A7: s1 . F7() = F10() . F9() by Th26;
then A8: S1[s1] by A2, A5, Th26, XREAL_1:41;
A9: s2 . F7() = F10() . F9() by A5, A7, Th35;
defpred S2[ Element of Funcs F2(),INT ] means $1 . F7() >= $1 . F8();
set T = (Funcs F2(),INT ) \ F3(),0 ;
A10: F6() complies_with_while_wrt (Funcs F2(),INT ) \ F3(),0 by AOFA_000:def 32;
set II = F4() \; (F7() += (- 1));
A11: F6() . F9(),F5() = F6() . s1,(while (F8() leq F7()),(F4() \; (F7() += (- 1)))) by A1, AOFA_000:def 29;
A12: s1 . F8() = F9() . F8() by A5, Th26;
then A13: s2 . F8() = F9() . F8() by A5, Th35;
per cases ( F10() . F9() >= F9() . F8() or F10() . F9() < F9() . F8() ) ;
suppose A14: F10() . F9() >= F9() . F8() ; :: thesis: ( P1[F6() . F9(),F5()] & ( F10() . F9() >= F9() . F8() implies (F6() . F9(),F5()) . F7() = (F9() . F8()) - 1 ) & ( F10() . F9() < F9() . F8() implies (F6() . F9(),F5()) . F7() = F10() . F9() ) & (F6() . F9(),F5()) . F8() = F9() . F8() )
deffunc H1( Element of Funcs F2(),INT ) -> Element of NAT = In ((($1 . F7()) + 1) - ($1 . F8())),NAT ;
defpred S3[ Element of Funcs F2(),INT ] means ( P1[$1] & S2[$1] );
A15: for s being Element of Funcs F2(),INT st S1[s] & s in (Funcs F2(),INT ) \ F3(),0 & S2[s] holds
S1[F6() . s,(F4() \; (F7() += (- 1)))]
proof
let s be Element of Funcs F2(),INT ; :: thesis: ( S1[s] & s in (Funcs F2(),INT ) \ F3(),0 & S2[s] implies S1[F6() . s,(F4() \; (F7() += (- 1)))] )
assume that
A16: S1[s] and
s in (Funcs F2(),INT ) \ F3(),0 and
A17: S2[s] ; :: thesis: S1[F6() . s,(F4() \; (F7() += (- 1)))]
thus P1[F6() . s,(F4() \; (F7() += (- 1)))] by A3, A16; :: thesis: ( ( F10() . F9() >= F9() . F8() implies ((F6() . s,(F4() \; (F7() += (- 1)))) . F7()) + 1 >= F9() . F8() ) & (F6() . s,(F4() \; (F7() += (- 1)))) . F8() = F9() . F8() )
reconsider s99 = F6() . s,F4() as Element of Funcs F2(),INT ;
reconsider s999 = F6() . s99,(F7() += (- 1)) as Element of Funcs F2(),INT ;
A18: s999 = F6() . s,(F4() \; (F7() += (- 1))) by AOFA_000:def 29;
A19: s999 . F7() = (s99 . F7()) - 1 by Th28;
s99 . F8() = s . F8() by A4, A16;
hence ( ( F10() . F9() >= F9() . F8() implies ((F6() . s,(F4() \; (F7() += (- 1)))) . F7()) + 1 >= F9() . F8() ) & (F6() . s,(F4() \; (F7() += (- 1)))) . F8() = F9() . F8() ) by A4, A5, A16, A17, A19, A18, Th28; :: thesis: verum
end;
A20: for s being Element of Funcs F2(),INT st S3[s] holds
( ( S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] implies F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 ) & ( F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 implies S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] ) & H1(F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))) < H1(s) )
proof
let s be Element of Funcs F2(),INT ; :: thesis: ( S3[s] implies ( ( S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] implies F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 ) & ( F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 implies S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] ) & H1(F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))) < H1(s) ) )
reconsider s9 = F6() . s,F4() as Element of Funcs F2(),INT ;
reconsider s99 = F6() . s9,(F7() += (- 1)) as Element of Funcs F2(),INT ;
reconsider s999 = F6() . s99,(F8() leq F7()) as Element of Funcs F2(),INT ;
A21: F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) = F6() . (F6() . s,(F4() \; (F7() += (- 1)))),(F8() leq F7()) by AOFA_000:def 29;
A22: s99 . F8() = s9 . F8() by A5, Th28;
A23: ( s99 . F7() >= s99 . F8() implies s999 . F3() = 1 ) by Th35;
A24: ( s99 . F7() < s99 . F8() implies s999 . F3() = 0 ) by Th35;
assume A25: S3[s] ; :: thesis: ( ( S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] implies F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 ) & ( F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 implies S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] ) & H1(F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))) < H1(s) )
then reconsider j = (s . F7()) - (s . F8()) as Element of NAT by INT_1:18;
A26: s999 . F7() = s99 . F7() by A5, Th35;
A27: s99 = F6() . s,(F4() \; (F7() += (- 1))) by AOFA_000:def 29;
then P1[s99] by A3, A25;
hence ( S3[F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))] iff F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7())) in (Funcs F2(),INT ) \ F3(),0 ) by A3, A5, A21, A27, A26, A24, A23, Th2, Th35; :: thesis: H1(F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))) < H1(s)
A28: s99 . F7() = (s9 . F7()) - 1 by Th28;
A29: s9 . F8() = s . F8() by A4, A25;
A30: s9 . F7() = s . F7() by A4, A25;
s999 . F8() = s99 . F8() by A5, Th35;
then H1(s999) = j by A26, A30, A29, A28, A22, FUNCT_7:def 1;
then H1(s999) + 1 = H1(s) by FUNCT_7:def 1;
hence H1(F6() . s,((F4() \; (F7() += (- 1))) \; (F8() leq F7()))) < H1(s) by A21, A27, NAT_1:13; :: thesis: verum
end;
A31: for s being Element of Funcs F2(),INT st S1[s] holds
( S1[F6() . s,(F8() leq F7())] & ( F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 implies S2[F6() . s,(F8() leq F7())] ) & ( S2[F6() . s,(F8() leq F7())] implies F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 ) )
proof
let s be Element of Funcs F2(),INT ; :: thesis: ( S1[s] implies ( S1[F6() . s,(F8() leq F7())] & ( F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 implies S2[F6() . s,(F8() leq F7())] ) & ( S2[F6() . s,(F8() leq F7())] implies F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 ) ) )
A32: ( s . F7() < s . F8() implies (F6() . s,(F8() leq F7())) . F3() = 0 ) by Th35;
assume A33: S1[s] ; :: thesis: ( S1[F6() . s,(F8() leq F7())] & ( F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 implies S2[F6() . s,(F8() leq F7())] ) & ( S2[F6() . s,(F8() leq F7())] implies F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 ) )
hence P1[F6() . s,(F8() leq F7())] by A3; :: thesis: ( ( F10() . F9() >= F9() . F8() implies ((F6() . s,(F8() leq F7())) . F7()) + 1 >= F9() . F8() ) & (F6() . s,(F8() leq F7())) . F8() = F9() . F8() & ( F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 implies S2[F6() . s,(F8() leq F7())] ) & ( S2[F6() . s,(F8() leq F7())] implies F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 ) )
A34: ( s . F7() >= s . F8() implies (F6() . s,(F8() leq F7())) . F3() = 1 ) by Th35;
(F6() . s,(F8() leq F7())) . F7() = s . F7() by A5, Th35;
hence ( ( F10() . F9() >= F9() . F8() implies ((F6() . s,(F8() leq F7())) . F7()) + 1 >= F9() . F8() ) & (F6() . s,(F8() leq F7())) . F8() = F9() . F8() & ( F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 implies S2[F6() . s,(F8() leq F7())] ) & ( S2[F6() . s,(F8() leq F7())] implies F6() . s,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 ) ) by A5, A33, A32, A34, Th2, Th35; :: thesis: verum
end;
s2 . F3() = 1 by A7, A12, A14, Th35;
then A35: ( F6() . s1,(F8() leq F7()) in (Funcs F2(),INT ) \ F3(),0 iff S3[F6() . s1,(F8() leq F7())] ) by A2, A3, A5, A12, A9, A14, Th35;
A36: F6() iteration_terminates_for (F4() \; (F7() += (- 1))) \; (F8() leq F7()),F6() . s1,(F8() leq F7()) from AOFA_000:sch 3(A35, A20);
A37: ( S1[F6() . s1,(while (F8() leq F7()),(F4() \; (F7() += (- 1))))] & not S2[F6() . s1,(while (F8() leq F7()),(F4() \; (F7() += (- 1))))] ) from AOFA_000:sch 5(A8, A36, A15, A31);
then ((F6() . F9(),F5()) . F7()) + 1 <= ((F9() . F8()) + 1) - 1 by A11, INT_1:20;
then ((F6() . F9(),F5()) . F7()) + 1 = F9() . F8() by A11, A14, A37, XXREAL_0:1;
hence ( P1[F6() . F9(),F5()] & ( F10() . F9() >= F9() . F8() implies (F6() . F9(),F5()) . F7() = (F9() . F8()) - 1 ) & ( F10() . F9() < F9() . F8() implies (F6() . F9(),F5()) . F7() = F10() . F9() ) & (F6() . F9(),F5()) . F8() = F9() . F8() ) by A1, A14, A37, AOFA_000:def 29; :: thesis: verum
end;
suppose A38: F10() . F9() < F9() . F8() ; :: thesis: ( P1[F6() . F9(),F5()] & ( F10() . F9() >= F9() . F8() implies (F6() . F9(),F5()) . F7() = (F9() . F8()) - 1 ) & ( F10() . F9() < F9() . F8() implies (F6() . F9(),F5()) . F7() = F10() . F9() ) & (F6() . F9(),F5()) . F8() = F9() . F8() )
then s2 . F3() = 0 by A7, A12, Th35;
then s2 nin (Funcs F2(),INT ) \ F3(),0 by Th2;
hence ( P1[F6() . F9(),F5()] & ( F10() . F9() >= F9() . F8() implies (F6() . F9(),F5()) . F7() = (F9() . F8()) - 1 ) & ( F10() . F9() < F9() . F8() implies (F6() . F9(),F5()) . F7() = F10() . F9() ) & (F6() . F9(),F5()) . F8() = F9() . F8() ) by A10, A9, A13, A11, A6, A38, AOFA_000:def 31; :: thesis: verum
end;
end;