Rational families of instanton bundles on P2n+1

Abstract

This paper is devoted to the theory of symplectic instanton bundles on an odd dimensional projective space P2n+1 with n 2. We study the 't Hooft instanton bundles introduced by Ottaviani and a new family of instanton bundles which generalizes one introduced on P3 independently by Rao and Skiti. The main result is the determination of the birational types of the moduli spaces of 't Hooft and of Rao-Skiti instanton bundles, respectively. Assuming a conjecture of Ottaviani, we show that the moduli space of all symplectic instanton bundles on P2n+1 with n 2 is reducible.