Modular symmetry of massive free fermions

Abstract

We construct an infinite set of conserved tensor currents of rank 2n, n=1,2,…, in the two-dimensional theory of free massive fermions, which are bilinear in the fermionic fields. The one-point functions of these currents on the torus depend on the modular parameter τ and spin structure (α,β). We show that, upon scaling the mass m so as to keep the combination m2Im(τ) invariant, the one-point functions are non-holomorphic Jacobi forms of weights (2n,0) or (0,2n) and index 0, with respect to the modular parameter τ and elliptic parameter z=ατ+β. In particular, we express the one-point functions as Kronecker-Eisenstein-type sums over the lattice Zτ+Z, which makes the modular symmetry manifest. We show that there is an action of three differential operators on these Jacobi forms which form an sl2(R) Lie algebra. Further we show that these Jacobi forms obey three differential equations arising from the representation theory of the Jacobi group.