Given X a cominuscule Grassmannian (or irreducible Hermitian symmetric space) and an integer p, we compute the minimum l (p) such that H⁰ (Ωᵖ\X (l (p) ) ) is not 0. This allows us to conclude that any codimension-one foliation of degree zero on a cominuscule Grassmannian is a pencil of hyperplanes, improving a result of the first and third authors with D. Faenzi. We also deduce the structure of codimension-one foliations of degree one. Finally, we provide families of examples of high codimensional foliations of minimal degree on classical Grassmannians, Lagrangian Grassmannians, Spinor varieties, and the Cayley plane.
Benedetti et al. (Tue,) studied this question.