Operad Structures in Geometric Quantization of the Moduli Space of Spatial Polygons

Abstract

The moduli space of spatial polygons is known as a symplectic manifold equipped with both K\"ahler and real polarizations. In this paper, associated to the K\"ahler and real polarizations, morphisms of operads fKah and fre are constructed by using the quantum Hilbert spaces HKah and Hre, respectively. Moreover, the relationship between the two morphisms of operads fKah and fre is studied and then the equality H Kah= Hre is proved in general setting. This operadic framework is regarded as a development of the recurrence relation method by Kamiyama for proving HKah= Hre in a special case.