let f be bijective decreasing UnOp of [.0,1.]; :: thesis: ( f . 0 = 1 & f . 1 = 0 )
KK: f . 0 = 1
proof
set y = f . 0;
set X = [.0,1.];
K1: 1 in [.0,1.] by XXREAL_1:1;
reconsider y = f . 0 as Element of [.0,1.] by XXREAL_1:1, FUNCT_2:5;
assume H0: f . 0 <> 1 ; :: thesis: contradiction
I3: rng f = [.0,1.] by FUNCT_2:def 3;
reconsider z = (f ") . 1 as Element of [.0,1.] by XXREAL_1:1, FUNCT_2:5;
L1: f . z = 1 by FUNCT_1:35, I3, K1;
then consider zz being Element of [.0,1.] such that
L2: zz < z by Wazne1, H0;
f . zz > f . z by L2, Decreas;
hence contradiction by L1, XXREAL_1:1; :: thesis: verum
end;
f . 1 = 0
proof
set X = [.0,1.];
K1: 0 in [.0,1.] by XXREAL_1:1;
reconsider y = f . 1 as Element of [.0,1.] by XXREAL_1:1, FUNCT_2:5;
assume H0: f . 1 <> 0 ; :: thesis: contradiction
I3: rng f = [.0,1.] by FUNCT_2:def 3;
reconsider z = (f ") . 0 as Element of [.0,1.] by XXREAL_1:1, FUNCT_2:5;
L1: f . z = 0 by FUNCT_1:35, I3, K1;
then consider zz being Element of [.0,1.] such that
L2: zz > z by Wazne2, H0;
f . zz < f . z by L2, Decreas;
hence contradiction by L1, XXREAL_1:1; :: thesis: verum
end;
hence ( f . 0 = 1 & f . 1 = 0 ) by KK; :: thesis: verum