Generic vanishing on homogeneous spaces in arbitrary characteristic
Abstract
Let X be a proper homogeneous space for a connected algebraic group G over an algebraically closed field. For locally closed smooth affine subvarieties W,Z⊂ X, we show that \[ (-1) X- W+ Zχ(gW Z)≥ 0 \] for generic g∈ G. This extends the characteristic-zero theorem of Schürmann--Simpson--Wang. Over finite fields, our methods give a trace-function identity on a dense open subset of G and a Lang--Weil estimate for the non-generic locus.
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