Chern characters for supersymmetric field theories

Abstract

We construct a map from d|1-dimensional Euclidean field theories to complexified K-theory when d=1 and complex analytic elliptic cohomology when d=2. This provides further evidence for the Stolz--Teichner program, while also identifying candidate geometric models for Chern characters within their framework. The construction arises as a higher-dimensional and parameterized generalization of Fei Han's realization of the Chern character in K-theory as dimensional reduction for 1|1-dimensional Euclidean field theories. In the elliptic case, the main new feature is a subtle interplay between the geometry of the super moduli space of 2|1-dimensional tori and the derived geometry of complex analytic elliptic cohomology. As a corollary, we obtain an entirely geometric proof that partition functions of N=(0,1) supersymmetric quantum field theories are weak modular forms, following a suggestion of Stolz and Teichner.