Let SU_C(2) be the moduli space of rank 2 semistable vector bundles with trivial determinant on a smooth complex algebraic curve C of genus g > 1, we assume C non hyperelliptic if g > 2. In this paper we construct large families of pointed rational normal curves over certain linear sections of SU_C(2). This allows us to give an interpretation of these subvarieties of SU_C(2) in terms of the moduli space of curves M_0,2g. In fact there exists a natural linear map SU_C(2) ----> P^g with modular meaning, whose fibers are birational to M_0,2g, the moduli space of 2g-pointed genus zero curves.
A structure theorem for SU_C(2) and the moduli of pointed rational curves / A. Alzati, M. Bolognesi. - In: JOURNAL OF ALGEBRAIC GEOMETRY. - ISSN 1056-3911. - 24:2(2015), pp. 283-310.
A structure theorem for SU_C(2) and the moduli of pointed rational curves
A. AlzatiPrimo
;
2015
Abstract
Let SU_C(2) be the moduli space of rank 2 semistable vector bundles with trivial determinant on a smooth complex algebraic curve C of genus g > 1, we assume C non hyperelliptic if g > 2. In this paper we construct large families of pointed rational normal curves over certain linear sections of SU_C(2). This allows us to give an interpretation of these subvarieties of SU_C(2) in terms of the moduli space of curves M_0,2g. In fact there exists a natural linear map SU_C(2) ----> P^g with modular meaning, whose fibers are birational to M_0,2g, the moduli space of 2g-pointed genus zero curves.
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