let Y be non empty set ; :: thesis: for G being Subset of (PARTITIONS Y)
for a, b being Element of Funcs Y,BOOLEAN
for PA being a_partition of Y holds a 'imp' b '<' (All a,PA,G) 'imp' (Ex b,PA,G)
let G be Subset of (PARTITIONS Y); :: thesis: for a, b being Element of Funcs Y,BOOLEAN
for PA being a_partition of Y holds a 'imp' b '<' (All a,PA,G) 'imp' (Ex b,PA,G)
let a, b be Element of Funcs Y,BOOLEAN ; :: thesis: for PA being a_partition of Y holds a 'imp' b '<' (All a,PA,G) 'imp' (Ex b,PA,G)
let PA be a_partition of Y; :: thesis: a 'imp' b '<' (All a,PA,G) 'imp' (Ex b,PA,G)
let z be Element of Y; :: according to BVFUNC_1:def 15 :: thesis: ( not (a 'imp' b) . z = TRUE or ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = TRUE )
A1: ( 'not' (a . z) = TRUE or 'not' (a . z) = FALSE ) by XBOOLEAN:def 3;
A2: z in EqClass z,(CompF PA,G) by EQREL_1:def 8;
assume (a 'imp' b) . z = TRUE ; :: thesis: ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = TRUE
then A3: ('not' (a . z)) 'or' (b . z) = TRUE by BVFUNC_1:def 11;
per cases ( 'not' (a . z) = TRUE or b . z = TRUE ) by A3, A1, BINARITH:7;
suppose 'not' (a . z) = TRUE ; :: thesis: ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = TRUE
then a . z = FALSE by MARGREL1:41;
then (B_INF a,(CompF PA,G)) . z = FALSE by A2, BVFUNC_1:def 19;
then (All a,PA,G) . z = FALSE by BVFUNC_2:def 9;
hence ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = ('not' FALSE ) 'or' ((Ex b,PA,G) . z) by BVFUNC_1:def 11
.= TRUE 'or' ((Ex b,PA,G) . z) by MARGREL1:41
.= TRUE by BINARITH:19 ;
:: thesis: verum
end;
suppose b . z = TRUE ; :: thesis: ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = TRUE
then (B_SUP b,(CompF PA,G)) . z = TRUE by A2, BVFUNC_1:def 20;
then (Ex b,PA,G) . z = TRUE by BVFUNC_2:def 10;
hence ((All a,PA,G) 'imp' (Ex b,PA,G)) . z = ('not' ((All a,PA,G) . z)) 'or' TRUE by BVFUNC_1:def 11
.= TRUE by BINARITH:19 ;
:: thesis: verum
end;
end;