let D be non empty set ; for n being Element of NAT
for A being Matrix of n,D holds (A @ ) @ = A
let n be Element of NAT ; for A being Matrix of n,D holds (A @ ) @ = A
let A be Matrix of n,D; (A @ ) @ = A
reconsider N = A @ as Matrix of n,D ;
A1:
( len A = n & width A = n )
by MATRIX_1:25;
A2: Indices (N @ ) =
[:(Seg n),(Seg n):]
by MATRIX_1:25
.=
Indices A
by MATRIX_1:25
;
A3:
for i, j being Nat st [i,j] in Indices (N @ ) holds
(N @ ) * i,j = A * i,j
proof
let i,
j be
Nat;
( [i,j] in Indices (N @ ) implies (N @ ) * i,j = A * i,j )
assume A4:
[i,j] in Indices (N @ )
;
(N @ ) * i,j = A * i,j
then
[j,i] in Indices N
by MATRIX_1:def 7;
then
(N @ ) * i,
j = N * j,
i
by MATRIX_1:def 7;
hence
(N @ ) * i,
j = A * i,
j
by A2, A4, MATRIX_1:def 7;
verum
end;
( len (N @ ) = n & width (N @ ) = n )
by MATRIX_1:25;
hence
(A @ ) @ = A
by A1, A3, MATRIX_1:21; verum