Braids and riemann surfaces

We examine the problem of determining which representations of the braid group on a Riemann surface and carried by the wave function of a quantized Abelian Chern Simons theory interacting with spinless non-dynamical matter. We generalize the quantization of Chern Simons theory to the case where the

In this paper, we address the following question: Given a natural number g, how many Riemann surfaces S 1 , ..., S k of genus g can there be such that S 1 , ..., S k all share the same spectrum of the Laplacian? It was shown by Buser in [Bu] that there is an upper bound N(g) to the size of such iso

We prove that the interior of any compact complex curve with smooth boundary in C 2 admits a proper holomorphic embedding into C 2 . In particular, if D is a bordered Riemann surface whose closure admits a holomorphic embedding into C 2 , then D admits a proper holomorphic embedding into C 2 .