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| arXiv:0806.3256 |
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Title: Gale duality and Koszul duality
Authors: Tom Braden, Anthony Licata, Nicholas Proudfoot, Ben Webster
Categories: math.RT Representation Theory (math.AG Algebraic Geometry; math.CO Combinatorics)
Comments: 55 pages; v2 contains significant revisions to proofs and to some of the results. Section 7 has been deleted; that material will be incorporated into a later paper by the same authors
MSC: 16S37, 52C35, 14M25
Journal reference: Advances in Mathematics, 225 (2010) 2002-2049
Abstract: Given an affine hyperplane arrangement with some additional structure, we
define two finite-dimensional, noncommutative algebras, both of which are
motivated by the geometry of hypertoric varieties. We show that these algebras
are Koszul dual to each other, and that the roles of the two algebras are
reversed by Gale duality. We also study the centers and representation
categories of our algebras, which are in many ways analogous to integral blocks
of category O.
Owner: Benjamin Webster
Version 1: Thu, 19 Jun 2008 18:26:38 GMT
Version 2: Fri, 12 Dec 2008 22:32:25 GMT
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