Compactified symplectic leaves in bundle moduli spaces

Abstract

Let E be a rank-2 vector bundle over an elliptic curve E, decomposable as a sum of line bundles of degrees d'>d 2, and L the determinant of E. The subspace L(E)⊂ Pn-1 PExt1(L,OE) consisting of classes of extensions with middle term isomorphic to E is one of the symplectic leaves of a remarkable Poisson structure on Pn-1 defined by Feigin-Odesskii/Polishchuk, and all symplectic leaves arise in this manner, as shown in earlier work that realizes L(E) as the base space of a principal Aut(E)-fibration. Here, we embed L(E) into a larger, projective base space L(E) of a principal Aut(E)-fibration whose total space consists of sections of E. The embedding realizes L(E)⊂ L(E) as a complement of an anticanonical divisor Y (one of the main results), and we give an explicit description of the normalization of Y as a projective-space bundle over a projective space. For d=2 L(E) is one of the three Hirzebruch surfaces i, i=0,1,2; we determine which occurs when and hence also the cases when L(E) is affine. Separately, we prove that for d< n2 the singular locus of the secant slice Secd,z(E)⊂ Pn-1, the portion of the dth secant variety of E consisting of points lying on spans of d-tuples with sum z∈ E, is precisely Secd-2. This strengthens result that L(E) is smooth, appearing in prior joint work with R. Kanda and S.P. Smith.