let T be non empty RelStr ; :: thesis: for A being Subset of T st T is filled holds
for n being Element of NAT holds Fcl (A,n) c= Fcl (A,(n + 1))
let A be Subset of T; :: thesis: ( T is filled implies for n being Element of NAT holds Fcl (A,n) c= Fcl (A,(n + 1)) )
assume A1: T is filled ; :: thesis: for n being Element of NAT holds Fcl (A,n) c= Fcl (A,(n + 1))
let n be Element of NAT ; :: thesis: Fcl (A,n) c= Fcl (A,(n + 1))
((Fcl A) . n) ^b = Fcl (A,(n + 1)) by Def2;
hence Fcl (A,n) c= Fcl (A,(n + 1)) by A1, FIN_TOPO:13; :: thesis: verum