let D be non empty set ; for G being Matrix of D
for k, m being Nat st width G = m + 1 & m > 0 & k in Seg m holds
( Col ((DelCol (G,1)),k) = Col (G,(k + 1)) & k in Seg (width (DelCol (G,1))) & k + 1 in Seg (width G) )
let G be Matrix of D; for k, m being Nat st width G = m + 1 & m > 0 & k in Seg m holds
( Col ((DelCol (G,1)),k) = Col (G,(k + 1)) & k in Seg (width (DelCol (G,1))) & k + 1 in Seg (width G) )
let k, m be Nat; ( width G = m + 1 & m > 0 & k in Seg m implies ( Col ((DelCol (G,1)),k) = Col (G,(k + 1)) & k in Seg (width (DelCol (G,1))) & k + 1 in Seg (width G) ) )
assume that
A1:
width G = m + 1
and
A2:
m > 0
and
A3:
k in Seg m
; ( Col ((DelCol (G,1)),k) = Col (G,(k + 1)) & k in Seg (width (DelCol (G,1))) & k + 1 in Seg (width G) )
1 <= width G
by A1, A2, SEQM_3:43;
then A4:
1 in Seg (width G)
by FINSEQ_1:1;
( 1 <= k & k <= m )
by A3, FINSEQ_1:1;
hence
( Col ((DelCol (G,1)),k) = Col (G,(k + 1)) & k in Seg (width (DelCol (G,1))) & k + 1 in Seg (width G) )
by A1, A4, Th68; verum