Strange duality on rational surfaces

Abstract

We study Le Potier's strange duality conjecture on a rational surface. We focus on the case involving the moduli space of rank 2 sheaves with trivial first Chern class and second Chern class 2, and the moduli space of 1-dimensional sheaves with determinant L and Euler characteristic 0. We show the conjecture for this case is true under some suitable conditions on L, which applies to L ample on any Hirzebruch surface e:=P(OP1P1(e)) except for e=1. When e=1, our result applies to L=aG+bF with b≥ a+[a/2], where F is the fiber class, G is the section class with G2=-1 and [a/2] is the integral part of a/2.