Elliptic Chern Characters and Elliptic Atiyah--Witten Formula

Abstract

Let G be a compact, connected, and simply connected Lie group. A principal G-bundle over a manifold X, equipped with a connection, together with a positive-energy representation of the loop group LG, gives rise to a circle-equivariant gerbe module on the free loop space LX. From this data we construct the elliptic Chern character on LX, and a refinement, the elliptic Bismut--Chern character, on the double loop space L2X. Generalizing the classical Atiyah--Witten formula from the free loop space LX to the double loop space L2X, we establish an elliptic Atiyah--Witten formula. The elliptic holonomy on L2X is defined by τ-deformed equivariant twisted parallel transport on LX. We show that the four Pfaffian sections, corresponding to the four spin structures on an elliptic curve, are identified with the four elliptic holonomies arising from the four virtual level-one positive-energy representations when G=Spin(2n). These constructions are intimately connected to the moduli of GC-bundles over elliptic curves and conformal blocks in the context of Chern--Simons gauge theory.