let n be Nat; :: thesis: for M1, M2 being Matrix of n, REAL st M1 is_less_than - M2 holds
M1 + M2 is Negative
let M1, M2 be Matrix of n, REAL ; :: thesis: ( M1 is_less_than - M2 implies M1 + M2 is Negative )
assume A1:
M1 is_less_than - M2
; :: thesis: M1 + M2 is Negative
A2:
( Indices M1 = [:(Seg n),(Seg n):] & Indices M2 = [:(Seg n),(Seg n):] & Indices (- M2) = [:(Seg n),(Seg n):] & Indices (M1 + M2) = [:(Seg n),(Seg n):] )
by MATRIX_1:25;
for i, j being Nat st [i,j] in Indices (M1 + M2) holds
(M1 + M2) * i,j < 0
proof
let i,
j be
Nat;
:: thesis: ( [i,j] in Indices (M1 + M2) implies (M1 + M2) * i,j < 0 )
assume A3:
[i,j] in Indices (M1 + M2)
;
:: thesis: (M1 + M2) * i,j < 0
then
M1 * i,
j < (- M2) * i,
j
by A1, A2, Def5;
then
M1 * i,
j < - (M2 * i,j)
by A2, A3, Th2;
then
(M1 * i,j) + (M2 * i,j) < 0
by XREAL_1:63;
hence
(M1 + M2) * i,
j < 0
by A2, A3, MATRIXR1:25;
:: thesis: verum
end;
hence
M1 + M2 is Negative
by Def2; :: thesis: verum