set SS = AllSymbolsOf S;
set T = S -termsOfMaxDepth ;
set TT = AllTermsOf S;
set s = (S -firstChar) . t;
set n = |.(ar ((S -firstChar) . t)).|;
A5:
(AllSymbolsOf S) -multiCat is |.(ar ((S -firstChar) . t)).| -tuples_on (AllTermsOf S) -one-to-one
by FOMODEL0:8;
A6:
dom ((AllSymbolsOf S) -multiCat) = ((AllSymbolsOf S) *) *
by FUNCT_2:def 1;
let IT1, IT2 be Element of (AllTermsOf S) * ; ( IT1 is |.(ar ((S -firstChar) . t)).| -element & t = <*((S -firstChar) . t)*> ^ ((S -multiCat) . IT1) & IT2 is |.(ar ((S -firstChar) . t)).| -element & t = <*((S -firstChar) . t)*> ^ ((S -multiCat) . IT2) implies IT1 = IT2 )
reconsider IT11 = IT1, IT22 = IT2 as FinSequence of AllTermsOf S by FINSEQ_1:def 11;
assume A7:
( IT1 is |.(ar ((S -firstChar) . t)).| -element & t = <*((S -firstChar) . t)*> ^ ((S -multiCat) . IT1) )
; ( not IT2 is |.(ar ((S -firstChar) . t)).| -element or not t = <*((S -firstChar) . t)*> ^ ((S -multiCat) . IT2) or IT1 = IT2 )
then
len IT11 = |.(ar ((S -firstChar) . t)).|
by CARD_1:def 7;
then reconsider IT111 = IT11 as Element of |.(ar ((S -firstChar) . t)).| -tuples_on (AllTermsOf S) by FINSEQ_2:133;
assume A8:
( IT2 is |.(ar ((S -firstChar) . t)).| -element & t = <*((S -firstChar) . t)*> ^ ((S -multiCat) . IT2) )
; IT1 = IT2
then
len IT22 = |.(ar ((S -firstChar) . t)).|
by CARD_1:def 7;
then reconsider IT222 = IT22 as Element of |.(ar ((S -firstChar) . t)).| -tuples_on (AllTermsOf S) by FINSEQ_2:133;
A9:
((AllSymbolsOf S) -multiCat) . IT111 = ((AllSymbolsOf S) -multiCat) . IT222
by FINSEQ_1:33, A7, A8;
( IT111 in (|.(ar ((S -firstChar) . t)).| -tuples_on (AllTermsOf S)) /\ (dom ((AllSymbolsOf S) -multiCat)) & IT222 in (|.(ar ((S -firstChar) . t)).| -tuples_on (AllTermsOf S)) /\ (dom ((AllSymbolsOf S) -multiCat)) )
by XBOOLE_0:def 4, A6;
hence
IT1 = IT2
by A9, A5; verum