Extending Smooth Cyclic Group Actions on the Poincare Homology Sphere

Abstract

Let X0 denote a compact, simply-connected smooth 4-manifold with boundary the Poincar\'e homology 3-sphere (2,3,5) and with even negative definite intersection form QX0=E8. We show that free Z/p actions on (2,3,5) do not extend to smooth actions on X0 with isolated fixed points for any prime p>7. The approach is to study the equivariant version of the Yang-Mills instanton-one moduli space for 4-manifolds with cylindrical ends. As an application we show that for p>7 a smooth Z/p action on \#8 S2 × S2 with isolated fixed points does not split along a free action on (2,3,5). The results hold for p=7 if the action is homologically trivial.