Poisson structure on the moduli spaces of sheaves of pure dimension one on a surface

Abstract

Let S be a smooth complex projective surface equipped with a Poisson structure s and also a polarization H. The moduli space MH(S,P) of stable sheaves on S having a fixed Hilbert polynomial P of degree one has a natural Poisson structure given by s, studied by Tyurin and Bottacin. We prove that the symplectic leaves of MH(S,P) are the fibers of the natural map from it to the symmetric power of the effective divisor on S given by the singular locus of s.