Unwinding toric degenerations and mirror symmetry for Grassmannians

Abstract

The most fundamental example of mirror symmetry compares the Fermat hypersurfaces in Pn and Pn/G, where G is a finite group that acts on Pn and preserves the Fermat hypersurface. We generalise this to hypersurfaces in Grassmannians, where the picture is richer and more complex. There is a finite group G that acts on the Grassmannian Gr(n,r) and preserves an appropriate Calabi-Yau hypersurface. We establish how mirror symmetry, toric degenerations, blow-ups and variation of GIT relate the Calabi-Yau hypersurfaces inside Gr(n,r) and Gr(n,r)/G. This allows us to describe a compactification of the Eguchi-Hori-Xiong mirror to the Grassmannian, inside a blow-up of the quotient of the Grassmannian by G.

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