On the standard Poisson structure and a Frobenius splitting of the basic affine space

Abstract

The goal of this paper is to construct a Frobenius splitting on G/U via the Poisson geometry of (G/U,πG/U), where G is a semi-simple algebraic group of classical type defined over an algebraically closed field of characteristic p > 3, U is the uniradical of a Borel subgroup of G and πG/U is the standard Poisson structure on G/U. We first study the Poisson geometry of (G/U,πG/U). Then, we develop a general theory for Frobenius splittings on T-Poisson varieties, where T is an algebraic torus. In particular, we prove that compatibly split subvarieties of Frobenius splittings constructed in this way must be T-Poisson sub-varieties. Lastly, we apply our general theory to construct a Frobenius splitting on G/U.