Toric Schubert varieties and directed Dynkin diagrams

Abstract

A flag variety is a homogenous variety G/B where G is a simple algebraic group over the complex numbers and B is a Boel subgroup of G. A Schubert variety Xw is a subvariety of G/B indexed by an element w in the Weyl group of G. It is called toric if it is a toric variety with respect to the maximal torus of G in B. In this paper, we associate an edge-labeled digraph Gw with a toric Schubert variety Xw and classify toric Schubert varieties up to isomorphism. We also give a simple criterion of when a toric Schubert variety Xw is (weak) Fano in terms of Gw. Finally, we discuss whether toric Schubert varieties can be distinguished by their integral cohomology rings up to isomorphism and show that this is the case when G is of simply-laced type.

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