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JCT
2000

Immanants and Finite Point Processes

13 years 11 months ago
Immanants and Finite Point Processes
Givena Hermitian,non-negativede nitekernelK and a character of the symmetric group on n letters, de ne the corresponding immanant function K x1;::: ;xn := P Qn i=1 Kxi;x i, where the sum is over all permutations of f1;::: ;ng. When is thesigncharacterresp. the trivial character, then K is a determinant resp. permanent. The function K is symmetricand non-negative,and, under suitableconditions,is also non-trivial and integrable with respect to the product measure n for a given measure . In this case, K can be normalised to be a symmetric probability density. The determinantal and permanental cases or this construction correspond to the fermion and boson point processes which have been studied extensively in the literature. The case where K gives rise to an orthogonal projection of L2 onto a nite dimensional subspace is studied here in detail. The determinantal instance of this special case has a substantial literature because of its role in several problems in mathematical physics, par...
Persi Diaconis, Steven N. Evans
Added 19 Dec 2010
Updated 19 Dec 2010
Type Journal
Year 2000
Where JCT
Authors Persi Diaconis, Steven N. Evans
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