The character of the supersymmetric Casimir energy

Abstract

We study the supersymmetric Casimir energy Esusy of N=1 field theories with an R-symmetry, defined on rigid supersymmetric backgrounds S1× M3, using a Hamiltonian formalism. These backgrounds admit an ambi-Hermitian geometry, and we show that the net contributions to Esusy arise from certain twisted holomorphic modes on R× M3, with respect to both complex structures. The supersymmetric Casimir energy may then be identified as a limit of an index-character that counts these modes. In particular this explains a recent observation relating Esusy on S1× S3 to the anomaly polynomial. As further applications we compute Esusy for certain secondary Hopf surfaces, and discuss how the index-character may also be used to compute generalized supersymmetric indices.