The LS-category of the product of lens spaces

Abstract

We reduced Rudyak's conjecture that a degree one map between closed manifolds cannot raise the Lusternik-Schnirelmann category to the computation of the category of the product of two lens spaces Lnp× Lqn with relatively prime p and q. We have computed cat(Lnp× Lnq) for values of p,q>n/2. It turns out that our computation supports the conjecture. For spin manifolds M we establish a criterion for the equality cat M=dim M-1 which is a K-theoretic refinement of the Katz-Rudyak criterion for cat M=dim M. We apply it to obtain the inequality cat(Lnp× Lnq) 2n-2 for all n and odd relatively prime p and q.