On Topological Homotopy Groups and Relation to Hawaiian Groups

Abstract

By generalizing the whisker topology on the nth homotopy group of pointed space (X, x0), denoted by πnwh(X, x0), we show that πnwh(X, x0) is a topological group if n 2. Also, we present some necessary and sufficient conditions for πnwh(X,x0) to be discrete, Hausdorff and indiscrete. Then we prove that Ln(X,x0) the natural epimorphic image of the Hawaiian group Hn(X, x0) is equal to the set of all classes of convergent sequences to the identity in πnwh(X, x0). As a consequence, we show that Ln(X, x0) Ln(Y, y0) if πnwh(X, x0) πnwh(Y, y0), but the converse does not hold in general, except for some conditions. Also, we show that on some classes of spaces such as semilocally n-simply connected spaces and n-Hawaiian like spaces, the whisker topology and the topology induced by the compact-open topology of n-loop space coincide. Finally, we show that n-SLT paths can transfer πnwh and hence Ln isomorphically along its points.