let Y be non empty set ; :: thesis: for G being Subset of (PARTITIONS Y)
for A, B, C, D, E, F being a_partition of Y st G is independent & G = {A,B,C,D,E,F} & A <> B & A <> C & A <> D & A <> E & A <> F & B <> C & B <> D & B <> E & B <> F & C <> D & C <> E & C <> F & D <> E & D <> F & E <> F holds
CompF B,G = (((A '/\' C) '/\' D) '/\' E) '/\' F
let G be Subset of (PARTITIONS Y); :: thesis: for A, B, C, D, E, F being a_partition of Y st G is independent & G = {A,B,C,D,E,F} & A <> B & A <> C & A <> D & A <> E & A <> F & B <> C & B <> D & B <> E & B <> F & C <> D & C <> E & C <> F & D <> E & D <> F & E <> F holds
CompF B,G = (((A '/\' C) '/\' D) '/\' E) '/\' F
let A, B, C, D, E, F be a_partition of Y; :: thesis: ( G is independent & G = {A,B,C,D,E,F} & A <> B & A <> C & A <> D & A <> E & A <> F & B <> C & B <> D & B <> E & B <> F & C <> D & C <> E & C <> F & D <> E & D <> F & E <> F implies CompF B,G = (((A '/\' C) '/\' D) '/\' E) '/\' F )
assume A1: ( G is independent & G = {A,B,C,D,E,F} & A <> B & A <> C & A <> D & A <> E & A <> F & B <> C & B <> D & B <> E & B <> F & C <> D & C <> E & C <> F & D <> E & D <> F & E <> F ) ; :: thesis: CompF B,G = (((A '/\' C) '/\' D) '/\' E) '/\' F
{A,B,C,D,E,F} = {B,A} \/ {C,D,E,F} by ENUMSET1:52;
then G = {B,A,C,D,E,F} by A1, ENUMSET1:52;
hence CompF B,G = (((A '/\' C) '/\' D) '/\' E) '/\' F by A1, Th34; :: thesis: verum