Jumping conics on a smooth quadric in 3
Abstract
We investigate the jumping conics of stable vector bundles E of rank 2 on a smooth quadric surface Q with the first Chern class c1=Q(-1,-1) with respect to the ample line bundle Q(1,1). We show that the set of jumping conics of E is a hypersurface of degree c2(E)-1 in 3*. Using these hypersurfaces, we describe moduli spaces of stable vector bundles of rank 2 on Q in the cases of lower c2(E).
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