Cp(X) for Hattori Spaces

Abstract

Motivated by the main results of the articles by Hattori and Bouziad, we seek to answer the following questions about Hattori spaces. Let A be a subset of the real line, then: Given a compact set K in the Euclidean topology, under what conditions is K compact in the Hattori space H(A)? When is H(A) a quasi-metrizable space? When is H(A) a semi-stratifiable space? When is Cp(H(A)) a normal space? When is Cp(H(A)) a Lindel\"of space? We obtain complete answers for 3 out of these 5 questions, while the last ones remain with partial answers, among them: \ Theorem: If R A is analytic, then Cp(H(A)) is not normal. Moreover when we work on the Solovay Model we can improve the previous result to only require R A to be uncountable.