let n, m, l, k be Nat; for K being Field
for M being Matrix of n,m,K st l in dom M & k in dom M holds
ILine (ILine M,l,k),l,k = M
let K be Field; for M being Matrix of n,m,K st l in dom M & k in dom M holds
ILine (ILine M,l,k),l,k = M
let M be Matrix of n,m,K; ( l in dom M & k in dom M implies ILine (ILine M,l,k),l,k = M )
assume A1:
( l in dom M & k in dom M )
; ILine (ILine M,l,k),l,k = M
set M1 = ILine M,l,k;
A2: dom (ILine M,l,k) =
Seg (len (ILine M,l,k))
by FINSEQ_1:def 3
.=
Seg (len M)
by Def1
.=
dom M
by FINSEQ_1:def 3
;
A3:
width (ILine M,l,k) = width M
by Th1;
A4:
for i, j being Nat st [i,j] in Indices M holds
(ILine (ILine M,l,k),l,k) * i,j = M * i,j
proof
let i,
j be
Nat;
( [i,j] in Indices M implies (ILine (ILine M,l,k),l,k) * i,j = M * i,j )
assume A5:
[i,j] in Indices M
;
(ILine (ILine M,l,k),l,k) * i,j = M * i,j
then A6:
j in Seg (width M)
by ZFMISC_1:106;
A7:
i in dom M
by A5, ZFMISC_1:106;
then
(
i <> l &
i <> k implies
(ILine (ILine M,l,k),l,k) * i,
j = (ILine M,l,k) * i,
j )
by A3, A2, A6, Def1;
then A8:
(
i <> l &
i <> k implies
(ILine (ILine M,l,k),l,k) * i,
j = M * i,
j )
by A7, A6, Def1;
(
(ILine (ILine M,l,k),l,k) * l,
j = (ILine M,l,k) * k,
j &
(ILine (ILine M,l,k),l,k) * k,
j = (ILine M,l,k) * l,
j )
by A1, A3, A2, A6, Def1;
hence
(ILine (ILine M,l,k),l,k) * i,
j = M * i,
j
by A1, A6, A8, Def1;
verum
end;
A9:
width (ILine (ILine M,l,k),l,k) = width (ILine M,l,k)
by Th1;
( len (ILine M,l,k) = len M & len (ILine (ILine M,l,k),l,k) = len (ILine M,l,k) )
by Def1;
hence
ILine (ILine M,l,k),l,k = M
by A9, A4, Th1, MATRIX_1:21; verum