take M = (n,n) --> (0. K); M is Anti-subsymmetric
let i, j, k, l be Nat; MATRIX17:def 2 ( [i,j] in Indices M & k = (n + 1) - j & l = (n + 1) - i implies M * (i,j) = - (M * (k,l)) )
assume that
A1:
[i,j] in Indices M
and
A2:
( k = (n + 1) - j & l = (n + 1) - i )
; M * (i,j) = - (M * (k,l))
A3:
Indices M = [:(Seg n),(Seg n):]
by MATRIX_0:24;
( k in Seg n & l in Seg n )
by A2, A1, A3, Lm2;
then
[k,l] in [:(Seg n),(Seg n):]
by ZFMISC_1:87;
then A4:
M * (k,l) = 0. K
by A3, MATRIX_0:46;
0. K = - (0. K)
by RLVECT_1:12;
hence
M * (i,j) = - (M * (k,l))
by A4, A1, MATRIX_0:46; verum