On locally compact semitopological 0-bisimple inverse ω-semigroups

Abstract

We describe the structure of Hausdorff locally compact semitopological 0-bisimple inverse ω-semigroups with compact maximal subgroups. In particular, we show that a Hausdorff locally compact semitopological 0-bisimple inverse ω-semigroup with a compact maximal subgroup is either compact or topologically isomorphic to the topological sum of its H-classes. We describe the structure of Hausdorff locally compact semitopological 0-bisimple inverse ω-semigroups with a monothetic maximal subgroups. In particular we prove the dichotomy for T1 locally compact semitopological Reilly semigroup (B(Z+,θ)0,τ) with adjoined zero and with a non-annihilating homomorphism θ Z+ Z+: (B(Z+,θ)0,τ) is either compact or discrete. At the end we discuss on the remainder under the closure of the discrete Reilly semigroup B(Z+,θ)0 in a semitopological semigroup.