let j be Element of NAT ; :: thesis: for G being V9() X_equal-in-line Y_equal-in-column Matrix of (TOP-REAL 2) st 1 <= j & j < width G holds
cell G,0 ,j = { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
let G be V9() X_equal-in-line Y_equal-in-column Matrix of (TOP-REAL 2); :: thesis: ( 1 <= j & j < width G implies cell G,0 ,j = { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) } )
A1:
cell G,0 ,j = (v_strip G,0 ) /\ (h_strip G,j)
by GOBOARD5:def 3;
assume
( 1 <= j & j < width G )
; :: thesis: cell G,0 ,j = { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
then A2:
h_strip G,j = { |[r,s]| where r, s is Real : ( (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
by Th23;
A3:
v_strip G,0 = { |[r,s]| where r, s is Real : r <= (G * 1,1) `1 }
by Th18;
thus
cell G,0 ,j c= { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
:: according to XBOOLE_0:def 10 :: thesis: { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) } c= cell G,0 ,jproof
let x be
set ;
:: according to TARSKI:def 3 :: thesis: ( not x in cell G,0 ,j or x in { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) } )
assume A4:
x in cell G,
0 ,
j
;
:: thesis: x in { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
then
x in v_strip G,
0
by A1, XBOOLE_0:def 4;
then consider r1,
s1 being
Real such that A5:
x = |[r1,s1]|
and A6:
r1 <= (G * 1,1) `1
by A3;
x in h_strip G,
j
by A1, A4, XBOOLE_0:def 4;
then consider r2,
s2 being
Real such that A7:
x = |[r2,s2]|
and A8:
(
(G * 1,j) `2 <= s2 &
s2 <= (G * 1,(j + 1)) `2 )
by A2;
s1 = s2
by A5, A7, SPPOL_2:1;
hence
x in { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
by A5, A6, A8;
:: thesis: verum
end;
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) } or x in cell G,0 ,j )
assume
x in { |[r,s]| where r, s is Real : ( r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 ) }
; :: thesis: x in cell G,0 ,j
then A9:
ex r, s being Real st
( x = |[r,s]| & r <= (G * 1,1) `1 & (G * 1,j) `2 <= s & s <= (G * 1,(j + 1)) `2 )
;
then A10:
x in h_strip G,j
by A2;
x in v_strip G,0
by A3, A9;
hence
x in cell G,0 ,j
by A1, A10, XBOOLE_0:def 4; :: thesis: verum