Pin(2)-monopole Floer homology, higher compositions and connected sums

Abstract

We study the behavior of Pin(2)-monopole Floer homology under connected sums. After constructing a (partially defined) A∞-module structure on the Pin(2)-monopole Floer chain complex of a three manifold (in the spirit of Baldwin and Bloom's monopole category), we identify up to quasi-isomorphism the Floer chain complex of a connected sum with a version of the A∞-tensor product of the modules of the summands. There is an associated Eilenberg-Moore spectral sequence converging to the Floer groups of the connected sum whose E2 page is the Tor of the Floer groups of the summands. We discuss in detail a simple example, and use this computation to show that the Pin(2)-monopole Floer homology of S3 has non trivial Massey products