Frobenius splitting of Schubert varieties of semi-infinite flag manifolds

Abstract

We exhibit basic algebro-geometric results on the formal model of semi-infinite flag varieties and its Schubert varieties over an algebraically closed field K of characteristic ≠ 2 from scratch. We show that the formal model of a semi-infinite flag variety admits a unique nice (ind)scheme structure, its projective coordinate ring has a Z-model, and it admits a Frobenius splitting compatible with the boundaries and opposite cells in positive characteristic. This establishes the normality of the Schubert varieties of the quasi-map space with a fixed degree (instead of their limits proved in [K, Math. Ann. 371 no.2 (2018)]) when char \, K =0 or 0, and the higher cohomology vanishing of their nef line bundles in arbitrary characteristic ≠ 2. Some particular cases of these results play crucial roles in our proof [K, arXiv:1805.01718] of a conjecture by Lam-Li-Mihalcea-Shimozono [J. Algebra 513 (2018)] that describes an isomorphism between affine and quantum K-groups of a flag manifold.