Vector Bundle construction via Monads on multiprojective Spaces

Abstract

In this paper we establish the existence of monads on multiprojective spaces X=P2n+1×P2n+1×·s×P2n+1. We prove stability of the kernel bundle which is a dual of a generalized Schwarzenberger bundle associated to the monads and prove that the cohomology vector bundle is simple, a generalization of instanton bundles. Next we construct monads on Pa1×·s×Pan and prove stability of the kernel bundle and that the cohomology vector bundle is simple. Lastly, we construct the morphisms that establish the existence of monads on P1×·s×P1.