let a be Element of REAL ; :: thesis: for n being Nat
for M being Matrix of n, REAL st a <= 0 & M is Negative holds
a * M is Nonnegative
let n be Nat; :: thesis: for M being Matrix of n, REAL st a <= 0 & M is Negative holds
a * M is Nonnegative
let M be Matrix of n, REAL ; :: thesis: ( a <= 0 & M is Negative implies a * M is Nonnegative )
assume A1:
( a <= 0 & M is Negative )
; :: thesis: a * M is Nonnegative
A2:
( len (a * M) = len M & width (a * M) = width M )
by MATRIXR1:27;
A3:
Indices (a * M) = Indices M
by MATRIXR1:28;
for i, j being Nat st [i,j] in Indices (a * M) holds
(a * M) * i,j >= 0
proof
let i,
j be
Nat;
:: thesis: ( [i,j] in Indices (a * M) implies (a * M) * i,j >= 0 )
assume A4:
[i,j] in Indices (a * M)
;
:: thesis: (a * M) * i,j >= 0
then
M * i,
j < 0
by A1, A3, Def2;
then
a * (M * i,j) >= 0
by A1;
hence
(a * M) * i,
j >= 0
by A2, A3, A4, Th4;
:: thesis: verum
end;
hence
a * M is Nonnegative
by Def4; :: thesis: verum