Monk's Rule and Giambelli's Formula for Peterson Varieties of All Lie Types

Abstract

A Peterson variety is a subvariety of the flag variety G/B which appears in the construction of the quantum cohomology of partial flag varieties. Each Peterson variety has a one-dimensional torus S1 acting on it. We give a basis of Peterson Schubert classes for HS1*(Pet) and identify the ring generators. In type A Harada-Tymoczko gave a positive Monk formula, and Bayegan-Harada gave Giambelli's formula for multiplication in the cohomology ring. This paper gives Monk's rule and Giambelli's formula for all Lie types.