let L be non empty transitive RelStr ; :: thesis: for S being non empty full SubRelStr of L
for X being Subset of S st ex_inf_of X,L & "/\" X,L in the carrier of S holds
( ex_inf_of X,S & "/\" X,S = "/\" X,L )
let S be non empty full SubRelStr of L; :: thesis: for X being Subset of S st ex_inf_of X,L & "/\" X,L in the carrier of S holds
( ex_inf_of X,S & "/\" X,S = "/\" X,L )
let X be Subset of S; :: thesis: ( ex_inf_of X,L & "/\" X,L in the carrier of S implies ( ex_inf_of X,S & "/\" X,S = "/\" X,L ) )
assume that
A1: ex_inf_of X,L and
A2: "/\" X,L in the carrier of S ; :: thesis: ( ex_inf_of X,S & "/\" X,S = "/\" X,L )
reconsider a = "/\" X,L as Element of S by A2;
consider a9 being Element of L such that
A4: X is_>=_than a9 and
A5: for b being Element of L st X is_>=_than b holds
b <= a9 and
for c being Element of L st X is_>=_than c & ( for b being Element of L st X is_>=_than b holds
b <= c ) holds
c = a9 by A1, Def8;
A6: a9 = "/\" X,L by A1, A4, A5, Def10;
thus ex_inf_of X,S :: thesis: "/\" X,S = "/\" X,L hence "/\" X,S = "/\" X,L by A3, Def10; :: thesis: verum