Dual canonical bases and embeddings of symmetric spaces

Abstract

For a connected reductive group Gk over an algebraically closed field k of char ≠ 2 and a fixed point subgroup Kk under an algebraic group involution, we construct a quantization and an integral model of any affine embeddings of the symmetric space Gk/Kk. We show that the coordinate ring of any affine embedding of Gk/Kk admits a dual canonical basis. We further construct an integral model for the canonical embedding (that is, an embedding which is complete, simple, and toroidal) of Gk/Kk. When Gk is of adjoint type, we obtain an integral model for the wonderful compactification of the symmetric space.