Strange duality on rational surfaces II: higher rank cases

Abstract

We study Le Potier's strange duality conjecture on a rational surface. We focus on the strange duality map SDcnr,L which involves the moduli space of rank r sheaves with trivial first Chern class and second Chern class n, and the moduli space of 1-dimensional sheaves with determinant L and Euler characteristic 0. We show there is an exact sequence relating the map SDcrr,L to SDcr-1r,L and SDcrr,L KX for all r≥1 under some conditions on X and L which applies to a large number of cases on 2 or Hirzebruch surfaces . Also on P2 we show that for any r>0, SDcrr,dH is an isomorphism for d=1,2, injective for d=3 and moreover SDc33,rH and SDc32,rH are injective. At the end we prove that the map SDcn2,L (n≥2) is an isomorphism for X=P2 or Fano rational ruled surfaces and gL=3, and hence so is SDc33,L as a corollary of our main result.