let X, Y, U be Subset of ExampleRIFSpace; ( X = {1,2} & Y = {1,2,3} & U = {2,4,5} implies not kappa (X,U) <= kappa (Y,U) )
assume A1:
( X = {1,2} & Y = {1,2,3} & U = {2,4,5} )
; not kappa (X,U) <= kappa (Y,U)
then A3:
card Y = 3
by CARD_2:58;
( 2 in U & not 1 in U )
by A1, ENUMSET1:def 1;
then
X /\ U = {2}
by A1, ZFMISC_1:54;
then R1:
card (X /\ U) = 1
by CARD_1:30;
R2:
card X = 2
by CARD_2:57, A1;
R0:
U = {2} \/ {4,5}
by A1, ENUMSET1:2;
ro:
2 in Y
by A1, ENUMSET1:def 1;
w1:
not 4 in Y
by A1, ENUMSET1:def 1;
not 5 in Y
by A1, ENUMSET1:def 1;
then rr:
Y misses {4,5}
by ZFMISC_1:51, w1;
Y /\ U =
(Y /\ {2}) \/ (Y /\ {4,5})
by R0, XBOOLE_1:23
.=
Y /\ {2}
by rr
;
then
Y /\ U = {2}
by XBOOLE_1:28, ro, ZFMISC_1:31;
then R3:
card (Y /\ U) = 1
by CARD_1:30;
W4:
kappa (X,U) = 1 / 2
by R1, R2, A1, KappaDef;
kappa (Y,U) = 1 / 3
by A3, R3, A1, KappaDef;
hence
not kappa (X,U) <= kappa (Y,U)
by W4; verum