On automorphisms of moduli spaces of parabolic vector bundles

Abstract

Fix n≥ 5 general points p1, …, pn∈P1, and a weight vector A = (a1, …, an) of real numbers 0 ≤ ai ≤ 1. Consider the moduli space MA parametrizing rank two parabolic vector bundles with trivial determinant on (P1, p1,… , pn) which are semistable with respect to A. Under some conditions on the weights, we determine and give a modular interpretation for the automorphism group of the moduli space MA. It is isomorphic to (Z2Z)k for some k∈ \0,…, n-1\, and is generated by admissible elementary transformations of parabolic vector bundles. The largest of these automorphism groups, with k=n-1, occurs for the central weight AF= (12,…,12). The corresponding moduli space MAF is a Fano variety of dimension n-3, which is smooth if n is odd, and has isolated singularities if n is even.