let C1, C2, C3 be non empty set ; :: thesis: for f being RMembership_Func of C1,C2
for g, h being RMembership_Func of C2,C3
for x, z being set st x in C1 & z in C3 holds
sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
let f be RMembership_Func of C1,C2; :: thesis: for g, h being RMembership_Func of C2,C3
for x, z being set st x in C1 & z in C3 holds
sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
let g, h be RMembership_Func of C2,C3; :: thesis: for x, z being set st x in C1 & z in C3 holds
sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
let x, z be set ; :: thesis: ( x in C1 & z in C3 implies sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) )
assume that
A1: x in C1 and
A2: z in C3 ; :: thesis: sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
A3: for y being Element of C2 st y in C2 holds
(max (min f,g,x,z),(min f,h,x,z)) . y = (min f,(max g,h),x,z) . y
proof
let y be Element of C2; :: thesis: ( y in C2 implies (max (min f,g,x,z),(min f,h,x,z)) . y = (min f,(max g,h),x,z) . y )
assume y in C2 ; :: thesis: (max (min f,g,x,z),(min f,h,x,z)) . y = (min f,(max g,h),x,z) . y
A4: [y,z] in [:C2,C3:] by A2, ZFMISC_1:106;
(max (min f,g,x,z),(min f,h,x,z)) . y = max ((min f,g,x,z) . y),((min f,h,x,z) . y) by FUZZY_1:def 5
.= max ((min f,g,x,z) . y),(min (f . [x,y]),(h . [y,z])) by A1, A2, Def2
.= max (min (f . [x,y]),(g . [y,z])),(min (f . [x,y]),(h . [y,z])) by A1, A2, Def2
.= min (f . [x,y]),(max (g . [y,z]),(h . [y,z])) by XXREAL_0:38
.= min (f . [x,y]),((max g,h) . [y,z]) by A4, FUZZY_1:def 5
.= (min f,(max g,h),x,z) . y by A1, A2, Def2 ;
hence (max (min f,g,x,z),(min f,h,x,z)) . y = (min f,(max g,h),x,z) . y ; :: thesis: verum
end;
set F = min f,g,x,z;
set G = min f,h,x,z;
A5: dom (min f,(max g,h),x,z) = C2 by FUNCT_2:def 1;
rng (max (min f,g,x,z),(min f,h,x,z)) is bounded by Th1;
then A6: rng (max (min f,g,x,z),(min f,h,x,z)) is bounded_above by XXREAL_2:def 11;
A7: for s being real number st 0 < s holds
ex y being set st
( y in dom (max (min f,g,x,z),(min f,h,x,z)) & (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y )
proof
let s be real number ; :: thesis: ( 0 < s implies ex y being set st
( y in dom (max (min f,g,x,z),(min f,h,x,z)) & (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y ) )
assume 0 < s ; :: thesis: ex y being set st
( y in dom (max (min f,g,x,z),(min f,h,x,z)) & (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y )
then consider r being real number such that
A8: r in rng (max (min f,g,x,z),(min f,h,x,z)) and
A9: (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < r by A6, SEQ_4:def 4;
ex y being set st
( y in dom (max (min f,g,x,z),(min f,h,x,z)) & r = (max (min f,g,x,z),(min f,h,x,z)) . y ) by A8, FUNCT_1:def 5;
hence ex y being set st
( y in dom (max (min f,g,x,z),(min f,h,x,z)) & (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y ) by A9; :: thesis: verum
end;
for s being real number st 0 < s holds
(sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
proof
let s be real number ; :: thesis: ( 0 < s implies (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) )
assume 0 < s ; :: thesis: (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z)))
then consider y being set such that
A10: y in dom (max (min f,g,x,z),(min f,h,x,z)) and
A11: (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y by A7;
A12: (max (min f,g,x,z),(min f,h,x,z)) . y = max ((min f,g,x,z) . y),((min f,h,x,z) . y) by A10, FUZZY_1:def 5;
A13: for y being set st y in C2 holds
( (min f,g,x,z) . y <= sup (rng (min f,g,x,z)) & (min f,h,x,z) . y <= sup (rng (min f,h,x,z)) )
proof
let y be set ; :: thesis: ( y in C2 implies ( (min f,g,x,z) . y <= sup (rng (min f,g,x,z)) & (min f,h,x,z) . y <= sup (rng (min f,h,x,z)) ) )
assume A14: y in C2 ; :: thesis: ( (min f,g,x,z) . y <= sup (rng (min f,g,x,z)) & (min f,h,x,z) . y <= sup (rng (min f,h,x,z)) )
then y in dom (min f,h,x,z) by FUNCT_2:def 1;
then A15: (min f,h,x,z) . y in rng (min f,h,x,z) by FUNCT_1:def 5;
rng (min f,h,x,z) is bounded by Th1;
then A16: rng (min f,h,x,z) is bounded_above by XXREAL_2:def 11;
rng (min f,g,x,z) is bounded by Th1;
then A17: rng (min f,g,x,z) is bounded_above by XXREAL_2:def 11;
y in dom (min f,g,x,z) by A14, FUNCT_2:def 1;
then (min f,g,x,z) . y in rng (min f,g,x,z) by FUNCT_1:def 5;
hence ( (min f,g,x,z) . y <= sup (rng (min f,g,x,z)) & (min f,h,x,z) . y <= sup (rng (min f,h,x,z)) ) by A15, A17, A16, SEQ_4:def 4; :: thesis: verum
end;
then A18: (min f,h,x,z) . y <= sup (rng (min f,h,x,z)) by A10;
(min f,g,x,z) . y <= sup (rng (min f,g,x,z)) by A10, A13;
then (max (min f,g,x,z),(min f,h,x,z)) . y <= max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) by A12, A18, XXREAL_0:26;
hence (sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s < max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) by A11, XXREAL_0:2; :: thesis: verum
end;
then for s being real number st 0 < s holds
(sup (rng (max (min f,g,x,z),(min f,h,x,z)))) - s <= max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) ;
then A19: sup (rng (max (min f,g,x,z),(min f,h,x,z))) <= max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) by XREAL_1:59;
A20: for y being set st y in C2 holds
(max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
proof
let y be set ; :: thesis: ( y in C2 implies (max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) )
assume y in C2 ; :: thesis: (max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
then y in dom (max (min f,g,x,z),(min f,h,x,z)) by FUNCT_2:def 1;
then A21: (max (min f,g,x,z),(min f,h,x,z)) . y in rng (max (min f,g,x,z),(min f,h,x,z)) by FUNCT_1:def 5;
rng (max (min f,g,x,z),(min f,h,x,z)) is bounded by Th1;
then rng (max (min f,g,x,z),(min f,h,x,z)) is bounded_above by XXREAL_2:def 11;
hence (max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A21, SEQ_4:def 4; :: thesis: verum
end;
rng (min f,h,x,z) is bounded by Th1;
then A22: rng (min f,h,x,z) is bounded_above by XXREAL_2:def 11;
A23: for s being real number st 0 < s holds
ex y being set st
( y in dom (min f,h,x,z) & (sup (rng (min f,h,x,z))) - s < (min f,h,x,z) . y )
proof
let s be real number ; :: thesis: ( 0 < s implies ex y being set st
( y in dom (min f,h,x,z) & (sup (rng (min f,h,x,z))) - s < (min f,h,x,z) . y ) )
assume 0 < s ; :: thesis: ex y being set st
( y in dom (min f,h,x,z) & (sup (rng (min f,h,x,z))) - s < (min f,h,x,z) . y )
then consider r being real number such that
A24: r in rng (min f,h,x,z) and
A25: (sup (rng (min f,h,x,z))) - s < r by A22, SEQ_4:def 4;
ex y being set st
( y in dom (min f,h,x,z) & r = (min f,h,x,z) . y ) by A24, FUNCT_1:def 5;
hence ex y being set st
( y in dom (min f,h,x,z) & (sup (rng (min f,h,x,z))) - s < (min f,h,x,z) . y ) by A25; :: thesis: verum
end;
for s being real number st 0 < s holds
(sup (rng (min f,h,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
proof
let s be real number ; :: thesis: ( 0 < s implies (sup (rng (min f,h,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) )
assume 0 < s ; :: thesis: (sup (rng (min f,h,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
then consider y being set such that
A26: y in dom (min f,h,x,z) and
A27: (sup (rng (min f,h,x,z))) - s < (min f,h,x,z) . y by A23;
(min f,h,x,z) . y <= max ((min f,g,x,z) . y),((min f,h,x,z) . y) by XXREAL_0:25;
then (min f,h,x,z) . y <= (max (min f,g,x,z),(min f,h,x,z)) . y by A26, FUZZY_1:def 5;
then A28: (sup (rng (min f,h,x,z))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y by A27, XXREAL_0:2;
(max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A20, A26;
hence (sup (rng (min f,h,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A28, XXREAL_0:2; :: thesis: verum
end;
then A29: sup (rng (min f,h,x,z)) <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by XREAL_1:59;
rng (min f,g,x,z) is bounded by Th1;
then A30: rng (min f,g,x,z) is bounded_above by XXREAL_2:def 11;
A31: for s being real number st 0 < s holds
ex y being set st
( y in dom (min f,g,x,z) & (sup (rng (min f,g,x,z))) - s < (min f,g,x,z) . y )
proof
let s be real number ; :: thesis: ( 0 < s implies ex y being set st
( y in dom (min f,g,x,z) & (sup (rng (min f,g,x,z))) - s < (min f,g,x,z) . y ) )
assume 0 < s ; :: thesis: ex y being set st
( y in dom (min f,g,x,z) & (sup (rng (min f,g,x,z))) - s < (min f,g,x,z) . y )
then consider r being real number such that
A32: r in rng (min f,g,x,z) and
A33: (sup (rng (min f,g,x,z))) - s < r by A30, SEQ_4:def 4;
ex y being set st
( y in dom (min f,g,x,z) & r = (min f,g,x,z) . y ) by A32, FUNCT_1:def 5;
hence ex y being set st
( y in dom (min f,g,x,z) & (sup (rng (min f,g,x,z))) - s < (min f,g,x,z) . y ) by A33; :: thesis: verum
end;
for s being real number st 0 < s holds
(sup (rng (min f,g,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
proof
let s be real number ; :: thesis: ( 0 < s implies (sup (rng (min f,g,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) )
assume 0 < s ; :: thesis: (sup (rng (min f,g,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z)))
then consider y being set such that
A34: y in dom (min f,g,x,z) and
A35: (sup (rng (min f,g,x,z))) - s < (min f,g,x,z) . y by A31;
(min f,g,x,z) . y <= max ((min f,g,x,z) . y),((min f,h,x,z) . y) by XXREAL_0:25;
then (min f,g,x,z) . y <= (max (min f,g,x,z),(min f,h,x,z)) . y by A34, FUZZY_1:def 5;
then A36: (sup (rng (min f,g,x,z))) - s < (max (min f,g,x,z),(min f,h,x,z)) . y by A35, XXREAL_0:2;
(max (min f,g,x,z),(min f,h,x,z)) . y <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A20, A34;
hence (sup (rng (min f,g,x,z))) - s <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A36, XXREAL_0:2; :: thesis: verum
end;
then sup (rng (min f,g,x,z)) <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by XREAL_1:59;
then max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) <= sup (rng (max (min f,g,x,z),(min f,h,x,z))) by A29, XXREAL_0:28;
then A37: sup (rng (max (min f,g,x,z),(min f,h,x,z))) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) by A19, XXREAL_0:1;
dom (max (min f,g,x,z),(min f,h,x,z)) = C2 by FUNCT_2:def 1;
hence sup (rng (min f,(max g,h),x,z)) = max (sup (rng (min f,g,x,z))),(sup (rng (min f,h,x,z))) by A5, A3, A37, PARTFUN1:34; :: thesis: verum