let A be non empty set ; :: thesis: for B being Finite_Subset of A
for L being 1_Lattice
for f being Function of A,the carrier of L
for u being Element of L st ( for x being Element of A st x in B holds
u [= f . x ) holds
u [= FinMeet B,f
let B be Finite_Subset of A; :: thesis: for L being 1_Lattice
for f being Function of A,the carrier of L
for u being Element of L st ( for x being Element of A st x in B holds
u [= f . x ) holds
u [= FinMeet B,f
let L be 1_Lattice; :: thesis: for f being Function of A,the carrier of L
for u being Element of L st ( for x being Element of A st x in B holds
u [= f . x ) holds
u [= FinMeet B,f
let f be Function of A,the carrier of L; :: thesis: for u being Element of L st ( for x being Element of A st x in B holds
u [= f . x ) holds
u [= FinMeet B,f
let u be Element of L; :: thesis: ( ( for x being Element of A st x in B holds
u [= f . x ) implies u [= FinMeet B,f )
reconsider f9 = f as Function of A,the carrier of (L .: ) ;
reconsider u9 = u as Element of (L .: ) ;
assume for x being Element of A st x in B holds
u [= f . x ; :: thesis: u [= FinMeet B,f
then A1: for x being Element of A st x in B holds
f9 . x [= u9 by Th53;
L .: is 0_Lattice by Th64;
then FinJoin B,f9 [= u9 by A1, Th70;
hence u [= FinMeet B,f by Th54; :: thesis: verum