Quasi-homogeneity of the moduli space of stable maps to homogeneous spaces

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. Let d∈ H2(X) be a degree. Let M0,3(X,d) be the (coarse) moduli space of three pointed genus zero stable maps to X of degree d. We prove under reasonable assumptions on d that M0,3(X,d) is quasi-homogeneous under the action of G. The essential assumption on d is that d is a minimal degree, i.e. that d is a degree which is minimal with the property that qd occurs with non-zero coefficient in the quantum product σuσv of two Schubert cycles σu and σv, where denotes the product in the (small) quantum cohomology ring QH*(X) attached to X. We prove our main result on quasi-homogeneity by constructing an explicit morphism which has a dense open G-orbit in M0,3(X,d). To carry out the construction of this morphism, we develop a combinatorial theory of generalized cascades of orthogonal roots which is interesting in its own right.