set N = B_6 ;
set Z = {0,1,(3 \ 1),2,(3 \ 2),3};
A1: the carrier of B_6 = {0,1,(3 \ 1),2,(3 \ 2),3} by YELLOW_1:1;
A2: B_6 is with_suprema
proof
let x, y be Element of B_6; :: according to LATTICE3:def 10 :: thesis: ex b1 being Element of the carrier of B_6 st
( x <= b1 & y <= b1 & ( for b2 being Element of the carrier of B_6 holds
( not x <= b2 or not y <= b2 or b1 <= b2 ) ) )
A3: {0,1,(3 \ 1),2,(3 \ 2),3} = the carrier of B_6 by YELLOW_1:1;
thus ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) ) :: thesis: verum
proof
per cases ( ( x = 0 & y = 0 ) or ( x = 0 & y = 3 \ 1 ) or ( x = 0 & y = 2 ) or ( x = 0 & y = 3 \ 2 ) or ( x = 0 & y = 3 ) or ( x = 3 \ 1 & y = 0 ) or ( x = 3 \ 1 & y = 3 \ 1 ) or ( x = 3 \ 1 & y = 2 ) or ( x = 1 & y = 0 ) or ( x = 1 & y = 1 ) or ( x = 1 & y = 3 \ 1 ) or ( x = 1 & y = 3 \ 2 ) or ( x = 1 & y = 3 ) or ( x = 1 & y = 2 ) or ( y = 1 & x = 0 ) or ( y = 1 & x = 1 ) or ( y = 1 & x = 3 \ 1 ) or ( y = 1 & x = 3 \ 2 ) or ( y = 1 & x = 3 ) or ( y = 1 & x = 2 ) or ( x = 3 \ 1 & y = 3 \ 2 ) or ( x = 3 \ 1 & y = 3 ) or ( x = 2 & y = 0 ) or ( x = 2 & y = 3 \ 1 ) or ( x = 2 & y = 2 ) or ( x = 2 & y = 3 \ 2 ) or ( x = 2 & y = 3 ) or ( x = 3 \ 2 & y = 0 ) or ( x = 3 \ 2 & y = 3 \ 1 ) or ( x = 3 \ 2 & y = 2 ) or ( x = 3 \ 2 & y = 3 \ 2 ) or ( x = 3 \ 2 & y = 3 ) or ( x = 3 & y = 0 ) or ( x = 3 & y = 3 \ 1 ) or ( x = 3 & y = 2 ) or ( x = 3 & y = 3 \ 2 ) or ( x = 3 & y = 3 ) ) by A3, ENUMSET1:def 4;
suppose ( x = 0 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A4: ( x = 3 \ 1 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
3 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 3 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 2 c= Segm 3 by NAT_1:39;
hence ( x <= z & y <= z ) by A4, YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let z9 be Element of B_6; :: thesis: ( x <= z9 & y <= z9 implies z <= z9 )
assume that
A5: x <= z9 and
A6: y <= z9 ; :: thesis: z <= z9
A7: z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} by YELLOW_1:1;
A8: 3 \ 1 c= z9 by A4, A5, YELLOW_1:3;
A11: Segm 2 c= z9 by A4, A6, YELLOW_1:3;
( 1 in 2 & 0 in 2 ) by TARSKI:def 2, CARD_1:50;
then ( 1 in z9 & 0 in z9 ) by A11;
then ( z9 <> 1 & z9 <> 0 ) ;
hence z <= z9 by A7, A12, A9, A14, ENUMSET1:def 4; :: thesis: verum
end;
suppose ( x = 1 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 1 & y = 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A16: ( x = 1 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
A17: Segm 1 c= Segm 3 by NAT_1:39;
1 \/ (3 \ 1) = 1 \/ 3 by XBOOLE_1:39
.= 3 by A17, XBOOLE_1:12 ;
then reconsider z = x \/ y as Element of B_6 by A1, A16, ENUMSET1:def 4;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A18: ( x = 1 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
3 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 3 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 3 by NAT_1:39;
hence ( x <= z & y <= z ) by A18, YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let z9 be Element of B_6; :: thesis: ( x <= z9 & y <= z9 implies z <= z9 )
assume that
A19: x <= z9 and
A20: y <= z9 ; :: thesis: z <= z9
A21: 3 \ 2 c= z9 by A18, A20, YELLOW_1:3;
A26: 1 c= z9 by A18, A19, YELLOW_1:3;
( z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} & z9 <> 0 ) by A26, YELLOW_1:1;
hence z <= z9 by A27, A24, A29, A22, ENUMSET1:def 4; :: thesis: verum
end;
suppose A31: ( x = 1 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 3 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A31, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A32: ( x = 1 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 2 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A32, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A33: ( y = 1 & x = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
A34: Segm 1 c= Segm 3 by NAT_1:39;
1 \/ (3 \ 1) = 1 \/ 3 by XBOOLE_1:39
.= 3 by A34, XBOOLE_1:12 ;
then reconsider z = x \/ y as Element of B_6 by A1, A33, ENUMSET1:def 4;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A35: ( y = 1 & x = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
3 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 3 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 3 by NAT_1:39;
hence ( x <= z & y <= z ) by A35, YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let z9 be Element of B_6; :: thesis: ( x <= z9 & y <= z9 implies z <= z9 )
assume that
A36: x <= z9 and
A37: y <= z9 ; :: thesis: z <= z9
A38: 3 \ 2 c= z9 by A35, A36, YELLOW_1:3;
A43: 1 c= z9 by A35, A37, YELLOW_1:3;
( z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} & z9 <> 0 ) by A43, YELLOW_1:1;
hence z <= z9 by A44, A41, A46, A39, ENUMSET1:def 4; :: thesis: verum
end;
suppose A48: ( y = 1 & x = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 3 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A48, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A49: ( y = 1 & x = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 1 c= Segm 2 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A49, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by Lm2, XBOOLE_1:12, XBOOLE_1:34;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 2 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A50: ( x = 2 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
3 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 3 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 2 c= Segm 3 by NAT_1:39;
hence ( x <= z & y <= z ) by A50, YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let z9 be Element of B_6; :: thesis: ( x <= z9 & y <= z9 implies z <= z9 )
assume that
A51: x <= z9 and
A52: y <= z9 ; :: thesis: z <= z9
A53: z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} by YELLOW_1:1;
A54: 3 \ 1 c= z9 by A50, A52, YELLOW_1:3;
A57: 2 c= z9 by A50, A51, YELLOW_1:3;
( 1 in 2 & 0 in 2 ) by CARD_1:50, TARSKI:def 2;
then ( 1 in z9 & 0 in z9 ) by A57;
then ( z9 <> 1 & z9 <> 0 ) ;
hence z <= z9 by A53, A58, A55, A60, ENUMSET1:def 4; :: thesis: verum
end;
suppose ( x = 2 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A62: ( x = 2 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
A63: Segm 2 c= Segm 3 by NAT_1:39;
2 \/ (3 \ 2) = 2 \/ 3 by XBOOLE_1:39
.= 3 by A63, XBOOLE_1:12 ;
then x \/ y in {0,1,(3 \ 1),2,(3 \ 2),3} by A62, ENUMSET1:def 4;
then reconsider z = x \/ y as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A64: ( x = 2 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 2 c= Segm 3 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A64, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by Lm2, XBOOLE_1:12, XBOOLE_1:34;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A65: ( x = 3 \ 2 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
A66: Segm 2 c= Segm 3 by NAT_1:39;
2 \/ (3 \ 2) = 2 \/ 3 by XBOOLE_1:39
.= 3 by A66, XBOOLE_1:12 ;
then x \/ y in {0,1,(3 \ 1),2,(3 \ 2),3} by A65, ENUMSET1:def 4;
then reconsider z = x \/ y as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose A67: ( x = 3 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
Segm 2 c= Segm 3 by NAT_1:39;
then reconsider z = x \/ y as Element of B_6 by A67, XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 by XBOOLE_1:12;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
then reconsider z = x \/ y as Element of B_6 ;
take z ; :: thesis: ( x <= z & y <= z & ( for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9 ) )
( x c= z & y c= z ) by XBOOLE_1:7;
hence ( x <= z & y <= z ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st x <= z9 & y <= z9 holds
z <= z9
let w be Element of B_6; :: thesis: ( x <= w & y <= w implies z <= w )
assume ( x <= w & y <= w ) ; :: thesis: z <= w
then ( x c= w & y c= w ) by YELLOW_1:3;
then x \/ y c= w by XBOOLE_1:8;
hence z <= w by YELLOW_1:3; :: thesis: verum
end;
end;
end;
end;
B_6 is with_infima
proof
let x, y be Element of B_6; :: according to LATTICE3:def 11 :: thesis: ex b1 being Element of the carrier of B_6 st
( b1 <= x & b1 <= y & ( for b2 being Element of the carrier of B_6 holds
( not b2 <= x or not b2 <= y or b2 <= b1 ) ) )
A68: {0,1,(3 \ 1),2,(3 \ 2),3} = the carrier of B_6 by YELLOW_1:1;
thus ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) ) :: thesis: verum
proof
per cases ( ( x = 0 & y = 0 ) or ( x = 0 & y = 3 \ 1 ) or ( x = 0 & y = 2 ) or ( x = 0 & y = 3 \ 2 ) or ( x = 0 & y = 3 ) or ( x = 3 \ 1 & y = 0 ) or ( x = 3 \ 1 & y = 3 \ 1 ) or ( x = 3 \ 1 & y = 2 ) or ( x = 1 & y = 0 ) or ( x = 1 & y = 1 ) or ( x = 1 & y = 3 \ 1 ) or ( x = 1 & y = 3 \ 2 ) or ( x = 1 & y = 3 ) or ( x = 1 & y = 2 ) or ( y = 1 & x = 0 ) or ( y = 1 & x = 1 ) or ( y = 1 & x = 3 \ 1 ) or ( y = 1 & x = 3 \ 2 ) or ( y = 1 & x = 3 ) or ( y = 1 & x = 2 ) or ( x = 3 \ 1 & y = 3 \ 2 ) or ( x = 3 \ 1 & y = 3 ) or ( x = 2 & y = 0 ) or ( x = 2 & y = 3 \ 1 ) or ( x = 2 & y = 2 ) or ( x = 2 & y = 3 \ 2 ) or ( x = 2 & y = 3 ) or ( x = 3 \ 2 & y = 0 ) or ( x = 3 \ 2 & y = 3 \ 1 ) or ( x = 3 \ 2 & y = 2 ) or ( x = 3 \ 2 & y = 3 \ 2 ) or ( x = 3 \ 2 & y = 3 ) or ( x = 3 & y = 0 ) or ( x = 3 & y = 3 \ 1 ) or ( x = 3 & y = 2 ) or ( x = 3 & y = 3 \ 2 ) or ( x = 3 & y = 3 ) ) by A68, ENUMSET1:def 4;
suppose ( x = 0 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 0 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A69: ( x = 3 \ 1 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
0 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 0 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) ;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let z9 be Element of B_6; :: thesis: ( z9 <= x & z9 <= y implies z9 <= z )
assume that
A70: z9 <= x and
A71: z9 <= y ; :: thesis: z9 <= z
A72: z9 c= 3 \ 1 by A69, A70, YELLOW_1:3;
A74: z9 c= 2 by A69, A71, YELLOW_1:3;
A75: now :: thesis: not z9 = 3 \ 1
assume z9 = 3 \ 1 ; :: thesis: contradiction
then A76: 2 in z9 by TARSKI:def 2, YELLOW11:3;
not 2 in 2 ;
hence contradiction by A74, A76; :: thesis: verum
end;
A79: now :: thesis: not z9 = 3 \ 2
assume z9 = 3 \ 2 ; :: thesis: contradiction
then A80: 2 in z9 by TARSKI:def 1, YELLOW11:4;
not 2 in 2 ;
hence contradiction by A74, A80; :: thesis: verum
end;
z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} by YELLOW_1:1;
hence z9 <= z by A75, A73, A79, A81, A77, ENUMSET1:def 4; :: thesis: verum
end;
suppose ( x = 1 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 1 & y = 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 1 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then x misses y by XBOOLE_1:79;
then x /\ y = 0 by XBOOLE_0:def 7;
then reconsider z = x /\ y as Element of B_6 by A1, ENUMSET1:def 4;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 1 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then x /\ y = 0 by Lm3, XBOOLE_0:def 7;
then reconsider z = x /\ y as Element of B_6 by A1, ENUMSET1:def 4;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A82: ( x = 1 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
Segm 1 c= Segm 3 by NAT_1:39;
then reconsider z = x /\ y as Element of B_6 by A82, XBOOLE_1:28;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 1 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 by CARD_1:49, CARD_1:50, ZFMISC_1:13;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then x misses y by XBOOLE_1:79;
then x /\ y = 0 by XBOOLE_0:def 7;
then reconsider z = x /\ y as Element of B_6 by A1, ENUMSET1:def 4;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then x /\ y = {} by Lm3, XBOOLE_0:def 7;
then reconsider z = x /\ y as Element of B_6 by A1, ENUMSET1:def 4;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A83: ( y = 1 & x = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
Segm 1 c= Segm 3 by NAT_1:39;
then reconsider z = x /\ y as Element of B_6 by A83, XBOOLE_1:28;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( y = 1 & x = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 by CARD_1:49, CARD_1:50, ZFMISC_1:13;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 1 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 by YELLOW11:3, YELLOW11:4, ZFMISC_1:13;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A84: ( x = 3 \ 1 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
(3 \ 1) /\ 3 = (3 /\ 3) \ 1 by XBOOLE_1:49
.= 3 \ 1 ;
then reconsider z = x /\ y as Element of B_6 by A84;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 2 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A85: ( x = 2 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
0 in {0,1,(3 \ 1),2,(3 \ 2),3} by ENUMSET1:def 4;
then reconsider z = 0 as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) ;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let z9 be Element of B_6; :: thesis: ( z9 <= x & z9 <= y implies z9 <= z )
assume that
A86: z9 <= x and
A87: z9 <= y ; :: thesis: z9 <= z
A88: z9 c= 3 \ 1 by A85, A87, YELLOW_1:3;
A90: z9 c= 2 by A85, A86, YELLOW_1:3;
A91: now :: thesis: not z9 = 3 \ 1
assume z9 = 3 \ 1 ; :: thesis: contradiction
then A92: 2 in z9 by TARSKI:def 2, YELLOW11:3;
not 2 in 2 ;
hence contradiction by A90, A92; :: thesis: verum
end;
A95: now :: thesis: not z9 = 3 \ 2
assume z9 = 3 \ 2 ; :: thesis: contradiction
then A96: 2 in z9 by TARSKI:def 1, YELLOW11:4;
not 2 in 2 ;
hence contradiction by A90, A96; :: thesis: verum
end;
z9 is Element of {0,1,(3 \ 1),2,(3 \ 2),3} by YELLOW_1:1;
hence z9 <= z by A91, A89, A95, A93, A97, ENUMSET1:def 4; :: thesis: verum
end;
suppose ( x = 2 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A98: ( x = 2 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
2 misses 3 \ 2 by XBOOLE_1:79;
then 2 /\ (3 \ 2) = 0 by XBOOLE_0:def 7;
then x /\ y in {0,1,(3 \ 1),2,(3 \ 2),3} by A98, ENUMSET1:def 4;
then reconsider z = x /\ y as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A99: ( x = 2 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
Segm 2 c= Segm 3 by NAT_1:39;
then reconsider z = x /\ y as Element of B_6 by A99, XBOOLE_1:28;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 by YELLOW11:3, YELLOW11:4, ZFMISC_1:13;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A100: ( x = 3 \ 2 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
2 misses 3 \ 2 by XBOOLE_1:79;
then 2 /\ (3 \ 2) = 0 by XBOOLE_0:def 7;
then x /\ y in {0,1,(3 \ 1),2,(3 \ 2),3} by A100, ENUMSET1:def 4;
then reconsider z = x /\ y as Element of B_6 by YELLOW_1:1;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 \ 2 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A101: ( x = 3 \ 2 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
(3 \ 2) /\ 3 = (3 /\ 3) \ 2 by XBOOLE_1:49
.= 3 \ 2 ;
then reconsider z = x /\ y as Element of B_6 by A101;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 0 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A102: ( x = 3 & y = 3 \ 1 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
(3 \ 1) /\ 3 = (3 /\ 3) \ 1 by XBOOLE_1:49
.= 3 \ 1 ;
then reconsider z = x /\ y as Element of B_6 by A102;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A103: ( x = 3 & y = 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
Segm 2 c= Segm 3 by NAT_1:39;
then reconsider z = x /\ y as Element of B_6 by A103, XBOOLE_1:28;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose A104: ( x = 3 & y = 3 \ 2 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
(3 \ 2) /\ 3 = (3 /\ 3) \ 2 by XBOOLE_1:49
.= 3 \ 2 ;
then reconsider z = x /\ y as Element of B_6 by A104;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
suppose ( x = 3 & y = 3 ) ; :: thesis: ex z being Element of B_6 st
( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
then reconsider z = x /\ y as Element of B_6 ;
take z ; :: thesis: ( z <= x & z <= y & ( for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z ) )
( z c= x & z c= y ) by XBOOLE_1:17;
hence ( z <= x & z <= y ) by YELLOW_1:3; :: thesis: for z9 being Element of B_6 st z9 <= x & z9 <= y holds
z9 <= z
let w be Element of B_6; :: thesis: ( w <= x & w <= y implies w <= z )
assume ( w <= x & w <= y ) ; :: thesis: w <= z
then ( w c= x & w c= y ) by YELLOW_1:3;
then w c= x /\ y by XBOOLE_1:19;
hence w <= z by YELLOW_1:3; :: thesis: verum
end;
end;
end;
end;
hence ( B_6 is with_suprema & B_6 is with_infima ) by A2; :: thesis: verum