Mod $p$ vanishing theorem of Seiberg-Witten invariants for 4-manifolds with $\Bbb Z_p$-actions

Abstract

We give an alternative proof of the mod $p$ vanishing theorem by F. Fang of Seiberg-Witten invariants under a cyclic group action of prime order, and generalize it to the case when $b_1 \geq 1$. Although we also use the finite dimensional approximation of the monopole map as well as Fang, our method is rather geometric. Furthermore, non-trivial examples of mod $p$ vanishing are given.