Equivariant category and Topological complexity of wedges

Abstract

We prove the formula equation* catG(X Y)=\catG(X),catG(Y)\ equation* for the equivariant category of the wedge X Y. As a direct application, we have that the wedge i=1m Xi is G-contractible if and only if each Xi is G-contractible, for each i=1,…,m. One further application is to compute the equivariant category of the quotient X/A, for a G-space X and an invariant subset A such that the inclusion A X is G-homotopic to a constant map x0:A X, for some x0∈ XG. Additionally, we discuss the equivariant and invariant topological complexities for wedges. For instance, as applications of our results, we obtain the following equalities: align* TCG(X Y)&=\TCG(X),TCG(Y),catG(X× Y)\, TCG(X Y)&=\TCG(X),TCG(Y),X YcatG× G(X× Y)\, align* for G-connected G-CW-complexes X and Y under certain conditions. Keywords: (Equivariant) Lusternik-Schnirelmann category, equivariant and invariant topological complexities, G-spaces, wedge product, smash product