On special subgroups of fundamental group

Abstract

Suppose α is a nonzero cardinal number, I is an ideal on arc connected topological space X, and P Iα(X) is the subgroup of π1(X) (the first fundamental group of X) generated by homotopy classes of α Iloops. The main aim of this text is to study P Iα(X)s and compare them. Most interest is in α∈\ω,c\ and I∈\ Pfin(X),\\\, where Pfin(X) denotes the collection of all finite subsets of X. We denote P\\α(X) with Pα(X). We prove the following statements: for arc connected topological spaces X and Y if Pα(X) is isomorphic to Pα(Y) for all infinite cardinal number α, then π1(X) is isomorphic to π1(Y); there are arc connected topological spaces X and Y such that π1(X) is isomorphic to π1(Y) but Pω(X) is not isomorphic to Pω(Y); for arc connected topological space X we have Pω(X)⊂eq Pc(X) ⊂eqπ1(X); for Hawaiian earring X, the sets Pω( X), Pc( X), and π1( X) are pairwise distinct. So Pα(X)s and P Iα(X)s will help us to classify the class of all arc connected topological spaces with isomorphic fundamental groups.