On uniformly continuous surjections between Cp-spaces over metrizable spaces

Abstract

Let X be metrizable, Y be perfectly normal and suppose that there exists a uniformly continuous surjection T: Cp(X) Cp(Y) (resp., T: Cp*(X) Cp*(Y)), where Cp(X) (resp., Cp*(X)) denotes the space of all real-valued continuous (resp., continuous and bounded) functions on X endowed with the pointwise convergence topology. We show that if additionally T is an inversely bounded mapping and X has some dimensional-like property P, then so does Y. For example, this is true if P is one of the following properties: zero-dimensionality, countable-dimensionality or strong countable-dimensionality. Also, we consider other properties P: of being a scattered, or a strongly σ-scattered space, or being a 1-space (see [17]). Our results strengthen and extend several results from [6], [13], [17].