Towards a quantization of the double via the enhanced symplectic category

Abstract

This paper considers the enhanced symplectic "category" for purposes of quantizing quasi-Hamiltonian G-spaces, where G is a compact simple Lie group. Our starting point is the well-acknowledged analogy between the cotangent bundle T*G in Hamiltonian geometry and the internally fused double D(G)=G× G in quasi-Hamiltonian geometry. Guillemin and Sternberg consider the former, studing half-densities and phase functions on its so-called character Lagrangians O⊂eq T*G. Our quasi-Hamiltonian counterpart replaces these character Lagrangians with the universal centralizers C of regular, 1k-integral conjugacy classes C⊂eq G. We show each universal centralizer to be a "quasi-Hamiltonian Lagrangian" in D(G), and to come equipped with a half-density and phase function. At the same time, we consider a Dehn twist-induced automorphism R:D(G) D(G) that lacks a natural Hamiltonian analogue. Each quasi-Hamiltonian Lagrangian R(C) is shown to have a clean intersection with every C', and to come equipped with a half-density and phase function of its own. This leads us to consider the possibility of a well-behaved, quasi-Hamiltonian notion of the BKS pairing between R(C) and C'. We construct such a pairing and study its properties. This is facilitated by the nice geometric fearures of R(C)C' and a reformulation of the classical BKS pairing. Our work is perhaps the first step towards a level-k quantization of D(G) via the enhanced symplectic "category".