let d be non zero Element of NAT ; :: thesis: for l9, r9, l, r being Element of REAL d st ( for i being Element of Seg d holds l9 . i <= r9 . i ) holds
( cell (l,r) c= cell (l9,r9) iff for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) )
let l9, r9, l, r be Element of REAL d; :: thesis: ( ( for i being Element of Seg d holds l9 . i <= r9 . i ) implies ( cell (l,r) c= cell (l9,r9) iff for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) ) )
assume A1: for i being Element of Seg d holds l9 . i <= r9 . i ; :: thesis: ( cell (l,r) c= cell (l9,r9) iff for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) )
thus ( cell (l,r) c= cell (l9,r9) implies for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) ) :: thesis: ( ( for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) ) implies cell (l,r) c= cell (l9,r9) )
proof
assume A2: cell (l,r) c= cell (l9,r9) ; :: thesis: for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i )
let i0 be Element of Seg d; :: thesis: ( l9 . i0 <= l . i0 & l . i0 <= r . i0 & r . i0 <= r9 . i0 )
per cases ( r . i0 < l . i0 or l . i0 <= r . i0 ) ;
suppose A3: r . i0 < l . i0 ; :: thesis: ( l9 . i0 <= l . i0 & l . i0 <= r . i0 & r . i0 <= r9 . i0 )
defpred S1[ Element of Seg d, Real] means ( $2 > l . $1 & $2 > r9 . $1 );
A4: for i being Element of Seg d ex xi being Real st S1[i,xi] by Th2;
consider x being Function of (Seg d),REAL such that
A5: for i being Element of Seg d holds S1[i,x . i] from FUNCT_2:sch 3(A4);
reconsider x = x as Element of REAL d by Def4;
ex i being Element of Seg d st
( r . i < l . i & ( x . i <= r . i or l . i <= x . i ) )
proof
take i0 ; :: thesis: ( r . i0 < l . i0 & ( x . i0 <= r . i0 or l . i0 <= x . i0 ) )
thus ( r . i0 < l . i0 & ( x . i0 <= r . i0 or l . i0 <= x . i0 ) ) by A3, A5; :: thesis: verum
end;
then A6: x in cell (l,r) ;
ex i being Element of Seg d st
( x . i < l9 . i or r9 . i < x . i )
proof
take i0 ; :: thesis: ( x . i0 < l9 . i0 or r9 . i0 < x . i0 )
thus ( x . i0 < l9 . i0 or r9 . i0 < x . i0 ) by A5; :: thesis: verum
end;
hence ( l9 . i0 <= l . i0 & l . i0 <= r . i0 & r . i0 <= r9 . i0 ) by A1, A2, A6, Th25; :: thesis: verum
end;
suppose A7: l . i0 <= r . i0 ; :: thesis: ( l9 . i0 <= l . i0 & l . i0 <= r . i0 & r . i0 <= r9 . i0 )
A8: l in cell (l,r) by Th27;
r in cell (l,r) by Th27;
hence ( l9 . i0 <= l . i0 & l . i0 <= r . i0 & r . i0 <= r9 . i0 ) by A1, A2, A7, A8, Th25; :: thesis: verum
end;
end;
end;
assume A9: for i being Element of Seg d holds
( l9 . i <= l . i & l . i <= r . i & r . i <= r9 . i ) ; :: thesis: cell (l,r) c= cell (l9,r9)
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in cell (l,r) or x in cell (l9,r9) )
assume A10: x in cell (l,r) ; :: thesis: x in cell (l9,r9)
then reconsider x = x as Element of REAL d ;
now
let i be Element of Seg d; :: thesis: ( l9 . i <= x . i & x . i <= r9 . i & l9 . i <= r9 . i )
A11: l9 . i <= l . i by A9;
A12: l . i <= x . i by A9, A10, Th25;
A13: x . i <= r . i by A9, A10, Th25;
r . i <= r9 . i by A9;
hence ( l9 . i <= x . i & x . i <= r9 . i ) by A11, A12, A13, XXREAL_0:2; :: thesis: l9 . i <= r9 . i
hence l9 . i <= r9 . i by XXREAL_0:2; :: thesis: verum
end;
hence x in cell (l9,r9) ; :: thesis: verum