Some properties of zero-mode wave functions in abelian Chern-Simons theory on the torus

Abstract

In geometric quantization a zero-mode wave function in abelian Chern-Simons theory on the torus can be defined as [ a, a ] = e- K(a, a)2 f (a) where K(a ,a ) denotes a K\"ahler potential for the zero-mode variable a ∈ C on the torus. We first review that the holomorphic wave function f(a) can be described in terms of the Jacobi theta functions by imposing gauge invariance on [ a, a ] where gauge transformations are induced by doubly periodic translations of a. We discuss that f(a) is quantum theoretically characterized by (i) an operative relation in the a-space representation and (ii) an inner product of [ a, a ]'s including ambiguities in the choice of K(a ,a ). We then carry out a similar analysis on the gauge invariance of [ a , a ] where the gauge transformations are induced by modular transformations of the zero-mode variable. We observe thatf(a) behaves as a modular form of weight 2 under the condition of |a|2 = 1, namely, . f ( - 1a ) = a2 f(a) ||a|2 = 1. Utilizing specific forms of f(a) in terms of the Jacobi theta functions, we further investigate how exactly f(a) can or cannot be interpreted as the modular form of weight 2; we extract conditions that make such an interpretation possible.