On feebly compact topologies on the semilattice nλ

Abstract

We study feebly compact topologies τ on the semilattice (nλ,) such that (nλ,τ) is a semitopological semilattice. All compact semilattice T1-topologies on nλ are described. Also we prove that for an arbitrary positive integer n and an arbitrary infinite cardinal λ for a T1-topology τ on nλ the following conditions are equivalent: (i) (nλ,τ) is a compact topological semilattice; (ii) (nλ,τ) is a countably compact topological semilattice; (iii) (nλ,τ) is a feebly compact topological semilattice; (iv) (nλ,τ) is a compact semitopological semilattice; (v) (nλ,τ) is a countably compact semitopological semilattice. We construct a countably pracompact H-closed quasiregular non-semiregular topology τfc2 such that (2λ,τfc2) is a semitopological semilattice with discontinuous semilattice operation and prove that for an arbitrary positive integer n and an arbitrary infinite cardinal λ every T1-semiregular feebly compact semitopological semilattice nλ is a compact topological semilattice.