let cF be complex-valued XFinSequence; :: thesis:
cF is COMPLEX -valued by Lm6;
then reconsider Fr2 = cF, Fr1 = Rev cF as XFinSequence of COMPLEX ;
A1: len Fr1 = len Fr2 by Def1;
defpred S₁[ set , set ] means for i being Nat st i = $1 holds
$2 = (len Fr1) - (1 + i);
A3: card (len Fr1) = card (len Fr1) ;
A4: for x being set st x in len Fr1 holds
ex y being set st
( y in len Fr1 & S₁[x,y] )

let x be set ; :: thesis:
assume A5: x in len Fr1 ; :: thesis:
reconsider k = x as Element of NAT by Th1, A5;
k < len Fr1 by A5, NAT_1:45;
then k + 1 <= len Fr1 by NAT_1:13;
then A6: (len Fr1) -' (1 + k) = (len Fr1) - (1 + k) by XREAL_1:235;
take (len Fr1) -' (1 + k) ; :: thesis:
(len Fr1) + 0 < (len Fr1) + (1 + k) by XREAL_1:10;
then (len Fr1) - (1 + k) < ((len Fr1) + (1 + k)) - (1 + k) by XREAL_1:11;
hence ( (len Fr1) -' (1 + k) in len Fr1 & S₁[x,(len Fr1) -' (1 + k)] ) by A6, NAT_1:45; :: thesis:

end;

consider P being Function of (len Fr1),(len Fr1) such that
A7: for x being set st x in len Fr1 holds
S₁[x,P . x] from FUNCT_2:sch 1(A4);
A8: for x1, x2 being set st x1 in len Fr1 & x2 in len Fr1 & P . x1 = P . x2 holds
x1 = x2

let x1, x2 be set ; :: thesis:
assume that
A9: x1 in len Fr1 and
A10: x2 in len Fr1 and
A11: P . x1 = P . x2 ; :: thesis:
reconsider i = x1, j = x2 as Element of NAT by A9, A10, Th1;
A12: P . x2 = (len Fr1) - (1 + j) by A7, A10;
P . x1 = (len Fr1) - (1 + i) by A7, A9;
hence x1 = x2 by A11, A12; :: thesis:

end;

A14: now

let x be set ; :: thesis:
assume A15: x in dom Fr1 ; :: thesis:
reconsider k = x as Element of NAT by A15;
P . k = (len Fr1) - (1 + k) by A7, A15;
hence Fr1 . x = Fr2 . (P . x) by A1, Def1, A15; :: thesis:

end;

A16: now

end;

for x being set st x in dom P & P . x in dom Fr2 holds
x in dom Fr1 ;
then Fr1 = Fr2 * P by A16, A14, FUNCT_1:20;
hence Sum cF = Sum (Rev cF) by A1, Th58; :: thesis: