On the loci of morphisms from P1 to G(r,n) with fixed splitting type of the restricted universal sub-bundle or quotient bundle

Abstract

Let n≥ 4, 2 ≤ r ≤ n-2 and e ≥ 1. We show that the intersection of the locus of degree e morphisms from P1 to G(r,n) with the restricted universal sub-bundles having a given splitting type and the locus of degree e morphisms with the restricted universal quotient-bundle having a given splitting type is non-empty and generically transverse. As a consequence, we get that the locus of degree e morphisms from P1 to G(r,n) with the restricted tangent bundle having a given splitting type need not always be irreducible.