Degrees of self-maps of products

Abstract

Every closed oriented manifold M is associated with a set of integers D(M), the set of self-mapping degrees of M. In this paper we investigate whether a product M× N admits a self-map of degree d, when neither D(M) nor D(N) contains d. We find sufficient conditions so that D(M× N) contains exactly the products of the elements of D(M) with the elements of D(N). As a consequence, we obtain manifolds M× N that do not admit self-maps of degree -1 (strongly chiral), that have finite sets of self-mapping degrees (inflexible) and that do not admit any self-map of degree dp for a prime number p. Furthermore we obtain a characterization of odd-dimensional strongly chiral hyperbolic manifolds in terms of self-mapping degrees of their products.