Mirkovic-Vilonen cycles and polytopes for a Symmetric pair
Abstract
Let G be a connected, simply-connected, and almost simple algebraic group, and let σ be a Dynkin automorphism on G. In this paper, we get a bijection between the set of -invariant MV cycles (polytopes) for G and the set of MV cycles (polytopes) for G, which is the fixed point subgroup of G; moreover, this bijection can be restricted to the set of MV cycles (polytopes) in irreducible representations. As an application, we obtain a new proof of the twining character formula.
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