Quantum cohomology and the Satake isomorphism

Abstract

We prove that the geometric Satake correspondence admits quantum corrections for minuscule Grassmannians of Dynkin types A and D. We find, as a corollary, that the quantum connection of a spinor variety OG(n,2n) can be obtained as the half-spinorial representation of that of the quadric Q2n-2. We view the (quantum) cohomology of these Grassmannians as endowed simultaneously with two structures, one of a module over the algebra of symmetric functions, and the other, of a module over the Langlands dual Lie algebra, and investigate the interaction between the two. In particular, we study primitive classes y in the cohomology of a minuscule Grassmannian G/P that are characterized by the condition that the operator of cup product by y is in the image of the Lie algebra action. Our main result states that quantum correction preserves primitivity. We provide a quantum counterpart to a result obtained by V. Ginzburg in the classical setting by giving explicit formulas for the quantum corrections to homogeneous primitive elements.