reconsider K = F1() --> F3(), J = F1() --> F2() as non-Empty Poset-yielding ManySortedSet of ;
A3: now
let X be Subset of (product K); :: thesis: ( P1[X, product K] implies for i being Element of F1() holds P1[ pi X,i,K . i] )
assume A4: P1[X, product K] ; :: thesis: for i being Element of F1() holds P1[ pi X,i,K . i]
let i be Element of F1(); :: thesis: P1[ pi X,i,K . i]
K . i = F3() by FUNCOP_1:13;
hence P1[ pi X,i,K . i] by A1, A4; :: thesis: verum
end;
A5: now
let i be Element of F1(); :: thesis: K . i is full SubRelStr of J . i
( K . i = F3() & J . i = F2() ) by FUNCOP_1:13;
hence K . i is full SubRelStr of J . i ; :: thesis: verum
end;
A6: now
let i be Element of F1(); :: thesis: for X being Subset of (K . i) st P1[X,K . i] holds
K . i inherits_inf_of X,J . i
let X be Subset of (K . i); :: thesis: ( P1[X,K . i] implies K . i inherits_inf_of X,J . i )
assume A7: P1[X,K . i] ; :: thesis: K . i inherits_inf_of X,J . i
( K . i = F3() & J . i = F2() ) by FUNCOP_1:13;
hence K . i inherits_inf_of X,J . i by A2, A7; :: thesis: verum
end;
for X being Subset of (product K) st P1[X, product K] holds
product K inherits_inf_of X, product J from YELLOW16:sch 3(A3, A5, A6);
 hence for X being Subset of (F3() |^ F1()) st P1[X,F3() |^ F1()] holds
F3() |^ F1() inherits_inf_of X,F2() |^ F1() ; :: thesis: verum