Z/p× Z/p actions on Sn× Sn

Abstract

We determine the homotopy type of quotients of Sn × Sn by free actions of Z/p × Z/p where 2p>n+3. Much like free Z/p actions, they can be classified via the first p-localized k-invariant, but there are restrictions on the possibilities, and these restrictions are sufficient to determine every possibility in the n=3 case. We use this to complete the classification of free Z/p × Z/p actions on S3 × S3, for p>3, by reducing the problem to the simultaneous classification of pairs of binary quadratic forms. Although the restrictions are not sufficient to determine which k-invariants are realizable in general, they can sometimes be used to rule out free actions by groups that contain Z/p× Z/p as a normal Abelian subgroup.