Functoriality of toric coherent-constructible correspondence

Abstract

A morphism from a diagonalizable group G to the torus of a toric variety X induces an action of G on X. We prove the category of ind-coherent sheaves on the quotient stack is equivalent to the category of sheaves on a cover of a real torus with singular supports contained in the FLTZ skeleton, extending Kuwagaki's nonequivariant coherent-constructible correspondence arXiv:1610.03214. We also investigate the functoriality of such correspondence for toric morphisms and inclusions of orbit closures.

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