Exclusions of smooth actions on spheres of the non-split extension of C2 by SL(2,5)

Abstract

There are four groups G fitting into a short exact sequence 1→ SL(2,5)→ G→ C2→ 1, where SL(2,5) is the special linear group of (2× 2)-matrices with entries in the field of five elements. Except for the direct product of SL(2,5) and C2, there are two other semidirect products of these two groups and just one non-semidirect product SL(2,5).C2, considered in this paper. It is known that each finite nonsolvable group can act on spheres with arbitrary positive number of fixed points. Clearly, SL(2,5).C2 is a nonsolvable group. Moreover, it turns out that SL(2,5).C2 possesses a free representation and as such, can potentially act pseudofreely with nonempty fixed point set on manifolds of arbitrarily large dimension. We prove that SL(2,5).C2 cannot act effectively with odd number of fixed points on low-dimensional spheres. In the special case of effective one fixed point actions, we are able to exclude a wider class of spheres. Moreover, we prove that specific pseudofree one fixed point actions of SL(2,5).C2 on spheres do not exist.