let C be non empty set ; :: thesis: for f, g, h being Membership_Func of C st g c= holds
h \ f c=
let f, g, h be Membership_Func of C; :: thesis: ( g c= implies h \ f c= )
assume A1: for c being Element of C holds f . c <= g . c ; :: according to FUZZY_1:def 3 :: thesis: h \ f c=
let c be Element of C; :: according to FUZZY_1:def 3 :: thesis: (h \ g) . c <= (h \ f) . c
f . c <= g . c by A1;
then 1 - (f . c) >= 1 - (g . c) by XREAL_1:12;
then (1_minus g) . c <= 1 - (f . c) by FUZZY_1:def 6;
then (1_minus g) . c <= (1_minus f) . c by FUZZY_1:def 6;
then min ((1_minus g) . c),(h . c) <= min ((1_minus f) . c),(h . c) by XXREAL_0:18;
then (h \ g) . c <= min ((1_minus f) . c),(h . c) by FUZZY_1:6;
hence (h \ g) . c <= (h \ f) . c by FUZZY_1:6; :: thesis: verum