On Iwase's manifolds

Abstract

In ~Iw2 Iwase has constructed two 16-dimensional manifolds M2 and M3 with LS-category 3 which are counter-examples to Ganea's conjecture: catLS (M× Sn)= catLS M+1. We show that the manifold M3 is a counter-example to the logarithmic law for the LS-category of the square of a manifold: catLS(M× M)=2 catLS M. Also, we construct a map of degree one f:N M2× M3 which reduces Rudyak's conjecture to the question whether catLS(M2× M3) 5. We show that catLS(M2× M3) 4.