Fourier-Mukai transform for fine compactified Prym varieties

Abstract

Consider a finite covering β : C X of a smooth projective curve X by a reduced, projective, planar curve C. Associated to two general polarizations on C, q and q', one can construct the corresponding compactified Prym varieties Pβ(q) and Pβ(q'). Consider to be the group of line bundles whose torsion coincides with the order of β. In this article we construct a Fourier-Mukai transform between the derived categories of Pβ(q) and the -equivariant derived category of Pβ(q'). Hence, we obtain a derived equivalence between the SL(n,C)-Hitchin fibre and its associated PGL(n,C)-Hitchin fibre for a dense class of singular spectral curves. Our work then provides the extension of the Fourier-Mukai transform constructed by Arinkin and Melo-Rapagnetta-Viviani, which corresponds to autoduality of GL(n,C)-Hitchin fibres in this class of singular spectral curves.