Siddhartha Sahi scite author profile

Heckman and Opdam introduced a non-symmetric analogue of Jack polynomials using Cherednik operators. In this paper, we derive a simple recursion formula for these polynomials and formulas relating the symmetric Jack polynomials with the non-symmetric ones. These formulas are then implemented by a closed expression of symmetric and non-symmetric Jack polynomials in terms of certain tableaux. The main application is a proof of a conjecture of Macdonald stating certain integrality and positivity properties of Jack polynomials.Comment: Preprint March 1996, to appear in Invent. Math., 15 pages, Plain Te

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The non-cooperative equilibria of a trading economy with complete markets and consistent prices

Sahi¹,

Yao²

1989

Journal of Mathematical Economics

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Generalized and degenerate Whittaker models

Gomez

Gourevitch

Sahi³

2017

Compositio Math.

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Abstract. We study generalized and degenerate Whittaker models for reductive groups over local fields of characteristic zero (archimedean or non-archimedean). Our main result is the construction of epimorphisms from the generalized Whittaker model corresponding to a nilpotent orbit to any degenerate Whittaker model corresponding to the same orbit, and to certain degenerate Whittaker models corresponding to bigger orbits. We also give choice-free definitions of generalized and degenerate Whittaker models. Finally, we explain how our methods imply analogous results for Whittaker-Fourier coefficients of automorphic representations.For GLn(F) this implies that a smooth admissible representation π has a generalized Whittaker model WO(π) corresponding to a nilpotent coadjoint orbit O if and only if O lies in the (closure of) the wavefront set WF(π). Previously this was only known to hold for F nonarchimedean and O maximal in WF(π), see [MW87]. We also express WO(π) as an iteration of a version of the Bernstein-Zelevinsky derivatives [BZ77,AGS15a]. This enables us to extend to GLn(R) and GLn(C) several further results from [MW87] on the dimension of WO(π) and on the exactness of the generalized Whittaker functor.

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The Spectrum of Certain Invariant Differential Operators Associated to a Hermitian Symmetric Space

Sahi

1994

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Let G / K be an irreducible Hermitian symmetric space of rank n and let 9 = t + p+ + p_ be the usual decomposition of 9 = Lie(G)c. Let us write P, V, and W = P ® V respectively, for the algebra of holomorphic polynomials, the algebra of constant coefficient holomorphic differential operators, and the "Weyl algebra" of polynomial coefficient holomorphic differential operators on 1'-, and regard all three as K -modules in the usual way.Let I = WK be the algebra of K-invariant differential operators on p_., and let A be the set {oX = (Ab" . ,An) E zn I Ai 2: ... 2: An 2: a}.Then, as we show in the next section, A naturally parametrizes both the irreducible K-submodules P).. of P, as well as a certain distinguished (vector space) basis {D.d of I. The problem we consider is to determine, for A, J.l E A, the scalar eigenvalue cl'(A) by which DI' acts on P>..Our main result, proved in Section 1, is the following characterization of these eigenvalues. For A = (Ai,' .. ,An), let us write IAI for Ai + ... + An; and set Am = {A E A IIAI:::; m}. Also, put P = (Pl,···,Pn) where Pi = d( n -2i + 1)/2 and d is as in the next section.*

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Siddhartha Sahi

Nonsymmetric Koornwinder Polynomials and Duality

A recursion and a combinatorial formula for Jack polynomials

The non-cooperative equilibria of a trading economy with complete markets and consistent prices

Generalized and degenerate Whittaker models

The Spectrum of Certain Invariant Differential Operators Associated to a Hermitian Symmetric Space

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