Poincar\'e bundle for the fixed determinant moduli space on a nodal curve

Abstract

Let Y be an integral nodal projective curve of arithmetic genus g 2 with m nodes defined over an algebraically closed field k and x a nonsingular closed point of Y. Let n and d be coprime integers with n 2. Fix a line bundle L of degree d on Y. Let UY(n,d,L) denote the (compactified) "fixed determinant moduli space". We prove that the restriction UL,x of the Poincare bundle to x × UY(n,d,L) is stable with respect to the polarisation θL and its restriction to x × U'Y(n,d,L), where U'Y(n,d,L) is the moduli space of vector bundles of rank n and determinant L, is stable with respect to any polarisation. We show that the Poincar\'e bundle UL on Y × UY(n,d,L) is stable with respect to the polarisation a α + b θL where α is a fixed ample Cartier divisor on Y and a, b are positive integers.