Symmetric subgroup schemes, Frobenius splittings, and quantum symmetric pairs
Abstract
Let Gk be a connected reductive algebraic group over an algebraically closed field k of characteristic ≠ 2. Let Kk ⊂ Gk be a quasi-split symmetric subgroup of Gk with respect to an involution θk of Gk. The classification of such involutions is independent of the characteristic of k (provided not 2). We first construct a closed subgroup scheme G of the Chevalley group scheme G over Z. The pair (G, G) parameterizes symmetric pairs of the given type over any algebraically closed field of characteristic ≠ 2, that is, the geometric fibre of G becomes the reductive group Kk ⊂ Gk over any algebraically closed field k of characteristic ≠ 2. As a consequence, we show the coordinate ring of the group Kk is spanned by the dual basis of the corresponding group. We then construct a quantum Frobenius splitting for the quasi-split group at roots of 1. This generalizes Lusztig's quantum Frobenius splitting for quantum groups at roots of 1. Over a field of positive characteristic, our quantum Frobenius splitting induces a Frobenius splitting of the algebraic group Kk. Finally, we construct Frobenius splittings of the flag variety Gk / Bk that compatibly split certain Kk-orbit closures over positive characteristics. We deduce cohomological vanishings of line bundles as well as normalities. Results apply to characteristic 0 as well, thanks to the existence of the scheme G. Our construction of splittings is based on the quantum Frobenius splitting of the corresponding group.
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