let f1, f2 be Function; :: thesis: ( dom f1 = the Sorts of A . ((the_arity_of o) /. i) & ( for x being object st x in the Sorts of A . ((the_arity_of o) /. i) holds
f1 . x = (Den (o,A)) . (a +* (i,x)) ) & dom f2 = the Sorts of A . ((the_arity_of o) /. i) & ( for x being object st x in the Sorts of A . ((the_arity_of o) /. i) holds
f2 . x = (Den (o,A)) . (a +* (i,x)) ) implies f1 = f2 )
assume that
A1: dom f1 = the Sorts of A . ((the_arity_of o) /. i) and
A2: for x being object st x in the Sorts of A . ((the_arity_of o) /. i) holds
f1 . x = (Den (o,A)) . (a +* (i,x)) and
A3: dom f2 = the Sorts of A . ((the_arity_of o) /. i) and
A4: for x being object st x in the Sorts of A . ((the_arity_of o) /. i) holds
f2 . x = (Den (o,A)) . (a +* (i,x)) ; :: thesis: f1 = f2
now :: thesis: for x being object st x in the Sorts of A . ((the_arity_of o) /. i) holds
f1 . x = f2 . x
let x be object ; :: thesis: ( x in the Sorts of A . ((the_arity_of o) /. i) implies f1 . x = f2 . x )
assume A5: x in the Sorts of A . ((the_arity_of o) /. i) ; :: thesis: f1 . x = f2 . x
then f1 . x = (Den (o,A)) . (a +* (i,x)) by A2;
hence f1 . x = f2 . x by A4, A5; :: thesis: verum
end;
hence f1 = f2 by A1, A3; :: thesis: verum