A5: width M = m by A3, MATRIX_1:24;
then A6: len (M @ ) = m by A4, MATRIX_2:12;
A7: len M = n by A3, MATRIX_1:24;
then width (M @ ) = n by A4, A5, MATRIX_2:12;
then M @ is Matrix of m,n,K by A4, A6, MATRIX_1:20;
then consider M1 being Matrix of m,n,K such that
A8: M1 = M @ ;
A9: width (ILine M1,l,k) = n by A4, MATRIX_1:24;
then A10: len ((ILine M1,l,k) @ ) = n by A3, MATRIX_2:12;
len (ILine M1,l,k) = m by A4, MATRIX_1:24;
then width ((ILine M1,l,k) @ ) = m by A3, A9, MATRIX_2:12;
then (ILine M1,l,k) @ is Matrix of n,m,K by A3, A10, MATRIX_1:20;
then consider M2 being Matrix of n,m,K such that
A11: M2 = (ILine M1,l,k) @ ;
take M2 ; :: thesis: ( len M2 = len M & ( for i, j being Nat st i in dom M & j in Seg (width M) holds
( ( j = l implies M2 * i,j = M * i,k ) & ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) ) ) )
for i, j being Nat st i in dom M & j in Seg (width M) holds
( ( j = l implies M2 * i,j = M * i,k ) & ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) )
proof
let i, j be Nat; :: thesis: ( i in dom M & j in Seg (width M) implies ( ( j = l implies M2 * i,j = M * i,k ) & ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) ) )
assume that
A12: i in dom M and
A13: j in Seg (width M) ; :: thesis: ( ( j = l implies M2 * i,j = M * i,k ) & ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) )
A14: [i,j] in Indices M by A12, A13, ZFMISC_1:106;
then A15: [j,i] in Indices M1 by A8, MATRIX_1:def 7;
then A16: ( j in dom M1 & i in Seg (width M1) ) by ZFMISC_1:106;
dom (ILine M1,l,k) = Seg (len (ILine M1,l,k)) by FINSEQ_1:def 3
.= Seg (len M1) by Def1
.= dom M1 by FINSEQ_1:def 3 ;
then A17: [j,i] in Indices (ILine M1,l,k) by A15, Th1;
thus ( j = l implies M2 * i,j = M * i,k ) :: thesis: ( ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) )
proof
A18: [i,k] in Indices M by A2, A12, ZFMISC_1:106;
assume A19: j = l ; :: thesis: M2 * i,j = M * i,k
M2 * i,j = (ILine M1,l,k) * j,i by A11, A17, MATRIX_1:def 7
.= M1 * k,i by A16, A19, Def1
.= M * i,k by A8, A18, MATRIX_1:def 7 ;
hence M2 * i,j = M * i,k ; :: thesis: verum
end;
thus ( j = k implies M2 * i,j = M * i,l ) :: thesis: ( j <> l & j <> k implies M2 * i,j = M * i,j )
proof
A20: [i,l] in Indices M by A1, A12, ZFMISC_1:106;
assume A21: j = k ; :: thesis: M2 * i,j = M * i,l
M2 * i,j = (ILine M1,l,k) * j,i by A11, A17, MATRIX_1:def 7
.= M1 * l,i by A16, A21, Def1
.= M * i,l by A8, A20, MATRIX_1:def 7 ;
hence M2 * i,j = M * i,l ; :: thesis: verum
end;
thus ( j <> l & j <> k implies M2 * i,j = M * i,j ) :: thesis: verum
proof
assume A22: ( j <> l & j <> k ) ; :: thesis: M2 * i,j = M * i,j
M2 * i,j = (ILine M1,l,k) * j,i by A11, A17, MATRIX_1:def 7
.= M1 * j,i by A16, A22, Def1
.= M * i,j by A8, A14, MATRIX_1:def 7 ;
hence M2 * i,j = M * i,j ; :: thesis: verum
end;
end;
hence ( len M2 = len M & ( for i, j being Nat st i in dom M & j in Seg (width M) holds
( ( j = l implies M2 * i,j = M * i,k ) & ( j = k implies M2 * i,j = M * i,l ) & ( j <> l & j <> k implies M2 * i,j = M * i,j ) ) ) ) by A3, A7, MATRIX_1:24; :: thesis: verum