Orthogonal and symplectic orbits in the affine flag variety of type A
Abstract
It is a classical result that the set K G /B is finite, where G is a reductive algebraic group over an algebraically closed field with characteristic not equal to two, B is a Borel subgroup of G, and K = Gθ is the fixed point subgroup of an involution of G. In this paper, we investigate the affine counterpart of the aforementioned set, where G is the general linear group over formal Laurent series, B is an Iwahori subgroup of G, and K is either the orthogonal group or the symplectic group over formal Laurent series. We construct explicit bijections between the double cosets K G/B and certain twisted affine involutions. This is the first combinatorial description of K-orbits in the affine flag variety of type A.
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