Lusin spaces as images of locally compact Polish spaces

Abstract

A Lusin space is a Hausdorff space being the image of a Polish space under a continuous bijection. Such spaces have multiple applications, in particular, as state spaces of various stochastic systems. In this work, we consider the spaces obtained as the images of a noncompact and locally compact Polish space (X, T), which we call c-Lusin. The main result is the statement that a c-Lusin space Y=f(X), can be written as Z Y1, where Z is a locally compact Polish space whereas Y1 is c-Lusin. At the same time, Y1 is the set of the discontinuity points of f-1 which is a closed subset of Y. Moreover, Y1 is nowhere dense if (and only if) Y is a Baire space. By the same arguments, Y1 can also be decomposed as Z1 Y2 with the properties as above. In the case where f can be extended to a continuous map f:X \∞\ Y, and thus Y1 is a singleton, we construct a metric on X such that the corresponding metric space is compact and homeomorphic to the c-Lusin space (f(X), T').