let n be Nat; for K being Field
for M2, M1 being Matrix of n,K st M2 * M1 = 1. (K,n) holds
M1 * M2 is Idempotent
let K be Field; for M2, M1 being Matrix of n,K st M2 * M1 = 1. (K,n) holds
M1 * M2 is Idempotent
let M2, M1 be Matrix of n,K; ( M2 * M1 = 1. (K,n) implies M1 * M2 is Idempotent )
assume A1:
M2 * M1 = 1. (K,n)
; M1 * M2 is Idempotent
A2:
( len M1 = n & width M1 = n )
by MATRIX_1:25;
A3:
width M2 = n
by MATRIX_1:25;
A4:
len M2 = n
by MATRIX_1:25;
width (M1 * M2) = n
by MATRIX_1:25;
then (M1 * M2) * (M1 * M2) =
((M1 * M2) * M1) * M2
by A2, A4, MATRIX_3:35
.=
(M1 * (1. (K,n))) * M2
by A1, A2, A4, A3, MATRIX_3:35
.=
M1 * M2
by MATRIX_3:21
;
hence
M1 * M2 is Idempotent
by Def1; verum