Countable Successor Ordinals as Generalized Ordered Topological Spaces

Abstract

A topological space L is called a linear ordered topological space (LOTS) whenever there is a linear order ≤ on L such that the topology on L is generated by the open sets of the form (a, b) with a < b and a, b ∈ L \ -∞, +∞ \. A topological space X is called a generalized ordered space (GO-space) whenever X is topologically embeddable in a LOTS. Main Theorem: Let X be a Hausdorff topological space. Assume that any continuous image of X is a GO-space. Then X is homeomorphic to a countable successor ordinal (with the order topology). The converse trivially holds.