Symplectic Tate homology

Abstract

For a Liouville domain W satisfying c1(W)=0, we propose in this note two versions of symplectic Tate homology HT(W) and HT(W) which are related by a canonical map HT(W) HT(W). Our geometric approach to Tate homology uses the moduli space of finite energy gradient flow lines of the Rabinowitz action functional for a circle in the complex plane as a classifying space for S1-equivariant Tate homology. For rational coefficients the symplectic Tate homology HT(W) has the fixed point property and is therefore isomorphic to H(W;Q) Q[u,u-1], where Q[u,u-1] is the ring of Laurent polynomials over the rationals. Using a deep theorem of Goodwillie, we construct examples of Liouville domains where the canonical map is not surjective and examples where it is not injective.