Morphisms from projective spaces to flags of minimal parabolic subgroups

Abstract

We classify nonconstant morphisms Pm G/P for m 4 when G = SL(n,C) (type~A) for a minimal parabolic subgroup P. Using the Borel presentation of cohomology and explicit Schubert intersection identities, we show that there is no nonconstant morphism P2 G/B; for minimal parabolic subgroup Pαi, there are no nonconstant morphisms P3 G/Pαi when i ∈ \1, n-1\, while such morphisms exist for 1 < i < n-1; and, after correcting an earlier error (pointed out by Yanjie Li), we give an elementary proof that there is no nonconstant morphism P4 G/Pαi for any minimal parabolic subgroup. The proofs are elementary and cohomological.