The Geometry of Fixed Point Varieties on Affine Flag Manifolds

Abstract

Let G be a semisimple, simply connected, algebraic group over an algebraically closed field k with Lie algebra g. We study the spaces of parahoric subalgebras of a given type containing a fixed nil-elliptic element of g k((π)), i.e. fixed point varieties on affine flag manifolds. We define a natural class of k*-actions on affine flag manifolds, generalizing actions introduced by Lusztig and Smelt. We formulate a condition on a pair (N,f) consisting of N∈g k((π)) and a k*-action f of the specified type which guarantees that f induces an action on the variety of parahoric subalgebras containing N. For the special linear and symplectic groups, we characterize all regular semisimple and nil-elliptic conjugacy classes containing a representative whose fixed point variety admits such an action. We then use these actions to find simple formulas for the Euler characteristics of those varieties for which the k*-fixed points are finite. We also obtain a combinatorial description of the Euler characteristics of the spaces of parabolic subalgebras containing a given element of certain nilpotent conjugacy classes of g.

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