Hopf invariants, topological complexity, and LS-category of the cofiber of the diagonal map for two-cell complexes

Abstract

Let X be a two-cell complex with attaching map α Sq Sp, and let CX be the cofiber of the diagonal inclusion X X× X. It is shown that the topological complexity ( TC) of X agrees with the Lusternik-Schnirelmann category ( cat) of CX in the (almost stable) range q≤2p-1. In addition, the equality TC(X)= cat(CX) is proved in the (strict) metastable range 2p-1<q≤3(p-1) under fairly mild conditions by making use of the Hopf invariant techniques recently developed by the authors in their study of the sectional category of arbitrary maps.