A contact McKay correspondence for links of simple singularities

Abstract

We compute the cylindrical contact homology of the links of the simple singularities. These manifolds are contactomorphic to S3/G for finite subgroups G⊂ SU(2). We perturb the degenerate contact form on S3/G with a Morse function, which is invariant under the corresponding H⊂ SO(3) action on S2, to achieve nondegeneracy up to an action threshold. The cylindrical contact homology is recovered by taking a direct limit of the action filtered homology groups. The ranks of this homology are given in terms of |Conj(G)|, demonstrating a Floer theoretic McKay correspondence.