English

Loops in SU(2), Riemann Surfaces, and Factorization, I

Representation Theory 2016-03-09 v4

Abstract

In previous work we showed that a loop g ⁣:S1SU(2)g\colon S^1 \to {\rm SU}(2) has a triangular factorization if and only if the loop gg has a root subgroup factorization. In this paper we present generalizations in which the unit disk and its double, the sphere, are replaced by a based compact Riemann surface with boundary, and its double. One ingredient is the theory of generalized Fourier-Laurent expansions developed by Krichever and Novikov. We show that a SU(2){\rm SU}(2) valued multiloop having an analogue of a root subgroup factorization satisfies the condition that the multiloop, viewed as a transition function, defines a semistable holomorphic SL(2,C){\rm SL}(2,\mathbb C) bundle. Additionally, for such a multiloop, there is a corresponding factorization for determinants associated to the spin Toeplitz operators defined by the multiloop.

Cite

@article{arxiv.1504.00715,
  title  = {Loops in SU(2), Riemann Surfaces, and Factorization, I},
  author = {Estelle Basor and Doug Pickrell},
  journal= {arXiv preprint arXiv:1504.00715},
  year   = {2016}
}
R2 v1 2026-06-22T09:09:16.527Z