Poisson Structures on Moduli Spaces of Framed Vector Bundles on Surfaces

## Abstract We give a complete classification of equivariant vector bundles of rank two over smooth complete toric surfaces and construct moduli spaces of such bundles. This note is a direct continuation of an earlier note where we developed a general description of equivariant sheaves on toric var

## Abstract Let ℳ︁(__n__ , __d__ ) be a coprime moduli space of stable vector bundles of rank __n__ ≥ 2 and degree __d__ over a complex irreducible smooth projective curve __X__ of genus __g__ ≥ 2 and ℳ︁~__ξ__~ ⊂ ℳ︁(__n__ , __d__ ) a fixed determinant moduli space. Assuming that the degree __d__ i

A 2-form is constructed on the space of connections on a principal bundle over an oriented surface with boundary. This induces a symplectic structure for the moduli space of flat connections with boundary holonomies lying in prescribed conjugacy classes. The Yang-Mills quantum field measure is descr

We prove tightness of ðr; pÞ-Sobolev capacities on configuration spaces equipped with Poisson measure. By using this result we construct surface measures on configuration spaces in the spirit of the Malliavin calculus. A related Gauss-Ostrogradskii formula is obtained.