Pieri integral formula and asymptotics of Jack unitary characters
Author(s)
Cuenca, Cesar
Download29_2017_373_ReferencePDF.pdf (453.7Kb)
PUBLISHER_POLICY
Publisher Policy
Article is made available in accordance with the publisher's policy and may be subject to US copyright law. Please refer to the publisher's site for terms of use.
Terms of use
Metadata
Show full item recordAbstract
We introduce Jack (unitary) characters and prove two kinds of formulas that are suitable for their asymptotics, as the lengths of the signatures that parametrize them go to infinity. The first kind includes several integral representations for Jack characters of one variable. The second identity we prove is the Pieri integral formula for Jack characters which, in a sense, is dual to the well known Pieri rule for Jack polynomials. The Pieri integral formula can also be seen as a functional equation for irreducible spherical functions of virtual Gelfand pairs. As an application of our formulas, we study the asymptotics of Jack characters as the corresponding signatures grow to infinity in the sense of Vershik–Kerov. We prove the existence of a small δ>0 such that the Jack characters of m variables have a uniform limit on the δ -neighborhood of the m-dimensional torus. Our result specializes to a theorem of Okounkov and Olshanski.
Date issued
2017-11Department
Massachusetts Institute of Technology. Department of MathematicsJournal
Selecta Mathematica
Publisher
Springer International Publishing
Citation
Cuenca, Cesar. “Pieri Integral Formula and Asymptotics of Jack Unitary Characters.” Selecta Mathematica, vol. 24, no. 3, July 2018, pp. 2737–89.
Version: Author's final manuscript
ISSN
1022-1824
1420-9020