Stephen Griffeth's preprints and publications |
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Affine Hecke algebras and the Schubert calculus (with A. Ram, in the European Journal of Combinatorics 25 (2004), no. 8 1263--1283) We studied the torus equivariant K-theory of homogeneous spaces by using Hecke algebras to obtain multiplication formulas for Schubert classes by codimension one Schubert classes, and to write down multiplication tables for all rank two groups. We make a ``positivity'' conjecture supported by these data. |
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My thesis. (At the University of Wisconsin-Madison, August 2006.) I studied connections between coinvariant rings and various types of modules for rational Cherednik algebras. Some of the results of this thesis appeared in the papers ``Towards a combinatorial representation theory for the rational Cherednik algebra of type G(r,p,n)'' and ''Jack polynomials and the coinvariant ring of G(r,p,n)'', but there are no inclusions among the three papers. |
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Towards a combinatorial representation theory for the rational Cherednik algebra of type G(r,p,n) (to appear in Proceedings of the Edinburgh Mathematical Society, arxiv.org/pdf/math.RT/0612733) This paper builds a machinery of intertwining operators for the rational Cherednik algebra of type G(r,p,n) analogous to Cherednik's machinery for double affine Hecke algebras of Weyl groups. As an application, I prove the analog of Gordon's theorem (previously Haiman's conjecture) on the diagonal coinvariant ring for the groups G(r,p,n). I have tried to make this paper self-contained enough that mathematicians in algebraic combinatorics who are unfamiliar with rational Cherednik algebras can read it. |
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Orthogonal functions generalizing Jack polynomials (to appear in Transactions of the AMS, arxiv.org/pdf/math.RT/0707.0251v1) This paper diagonalizes the standard (sometimes called ``Verma'') modules for the rational Cherednik algebra of type G(r,1,n) with respect to the Dunkl-Opdam subalgebra, and as an application determines the submodule structure in the case when the eigenspaces are one-dimensional. The eigenbasis obtained is a generalization of the non-symmetric Jack polynomials, and the combinatorics that controls the submodule structure is built upon (and analogous to) the Jucys-Murphy tableaux combinatorics that controls representations of the symmetric group. |
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Jack polynomials and the coinvariant ring of G(r,p,n) (to appear in Proceedings of the AMS) This paper contains a strengthening of the results in my thesis. It shows that the descent representations, first consdiered by Garsia-Stanton for the symmetric group and later by Adin-Brenti-Roichman and Bagno-Biagioli for the groups G(r,p,n), are realizable as irreducible Hecke-algebra submodules of the coinvariant ring. The basic idea is to write down a particular basis for the coinvariant ring consisting of non-symmetric Jack polynomials and study the action of the rational Cherednik algebra on that basis. |
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Positivity and Kleiman transversality in equivariant K-theory of homogeneous spaces (with D. Anderson and E. Miller) We prove the Griffeth-Ram and Graham-Kumar conjectures on the ``positivity'' of the structure constants of equivariant K-theory of homogeneous spaces. This generalizes theorems of Graham in equivariant cohomology and Brion in ordinary K-theory. The main tools are Edidin-Graham's approximate mixing space approach to equivariant K-theory, Sierra's homological transversality theorem, and Brion's implementation of Kawamata-Viehweg vanishing for calculating structure constants in ordinary K-theory. |
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Appendix to Unitary representations of rational Cherednik algebras (by P. Etingof and E. Stoica, to appear in Representation Theory) The paper by Etingof and Stoica initiates the study of unitary representations of rational Cherednik algebras, and as a consequence proves the Dunkl-Kasatani conjecture on the submodule structures of the polynomial representation of the rational Cherednik algebra of type A in full generality (a previous proof by Enomoto assumed the parameter was not a half integer). In the appendix, I use results of I. Cherednik and T. Suzuki to complete the classification of unitary modules for the rational Cherednik algebra of type A that Etingof and Stoica had conjectured in a preliminary version of the paper. |