Curve neighborhoods and minimal degrees in quantum products

Abstract

Let G be a connected, simply connected, simple, complex, linear algebraic group. Let P be an arbitrary parabolic subgroup of G. Let X=G/P be the G-homogeneous projective space attached to this situation. We consider the (small) quantum cohomology ring (QH*(X),) attached to X. We prove that there exists a unique degree d which is minimal with the property that qd occurs with non-zero coefficient in the quantum product of two point classes. We denote this minimal degree in pt by dX. We give an explicit formula to compute dX in terms of the cascade of orthogonal roots. We construct an explicit curve of degree dX passing through two general points in X. Moreover, we prove that dX is the unique maximal element of the set of all minimal degrees in some quantum product of two Schubert classes.