On the fundamental groups of perforated surfaces

Abstract

A perforated surface is the complement := A of a countable dense subset A in a connected paracompact surface . It is known that the topological type of A is independent of the choice of A. Any perforated surface is one-dimensional, connected, locally path connected, and is not semi-locally simply connected at any of its points. In this paper we obtain a classification theorem for perforated surfaces, using the classification theorem for surfaces. We show that any connected covering of a perforated surface arises from a covering of a surface ' such that '. We show that the fundamental group of perforated surfaces are large. We also show that the fundamental groups of , the Sierpi\'nski curve and the Menger curve are not Hopfian.