Examples of Free Actions on Products of Spheres

Abstract

We construct a non-abelian extension of S1 by 3 × 3, and prove that acts freely and smoothly on S5 × S5. This gives new actions on S5 × S5 for an infinite family of finite 3-groups. We also show that any finite odd order subgroup of the exceptional Lie group G2 admits a free smooth action on S11× S11. This gives new actions on S11× S11 for an infinite family of finite groups. We explain the significance of these families , for the general existence problem, and correct some mistakes in the literature.