Raisa M. Asherova, Čestmír Burdík, Miloslav Havlíček, Yuri F. Smirnov, Valeriy N. Tolstoy, “<nobr>$q$</nobr>-Analog of Gelfand–Graev Basis for the Noncompact Quantum Algebra <nobr>$U_q(u(n,1))$</nobr>”, SIGMA, 2010, Volume 6,010, 13 pp.

This article is cited in 3 papers

$q$-Analog of Gelfand–Graev Basis for the Noncompact Quantum Algebra $U_q(u(n,1))$

Raisa M. Asherova^a, Čestmír Burdík^b, Miloslav Havlíček^b, Yuri F. Smirnov^a, Valeriy N. Tolstoy^ba

^a Institute of Nuclear Physics, Moscow State University, 119992 Moscow, Russia
^b Department of Mathematics, Faculty of Nuclear Sciences and Physical Engineering, Czech Technical University in Prague, Trojanova 13, 12000 Prague 2, Czech Republic

Abstract: For the quantum algebra $U_q(\mathfrak{gl}(n+1))$ in its reduction on the subalgebra $U_q(\mathfrak{gl}(n))$ $Z_q(\mathfrak{gl}(n+1),\mathfrak{gl}(n))$ is given in terms of the generators and their defining relations. Using this $Z$-algebra we describe Hermitian irreducible representations of a discrete series for the noncompact quantum algebra $U_q(u(n,1))$ which is a real form of $U_q(\mathfrak{gl}(n+1))$, namely, an orthonormal Gelfand–Graev basis is constructed in an explicit form.

Keywords: quantum algebra; extremal projector; reduction algebra; Shapovalov form; noncompact quantum algebra; discrete series of representations; Gelfand–Graev basis.

MSC: 17B37; 81R50

Received: November 5, 2009; in final form January 15, 2010; Published online January 26, 2010

Language: English

DOI: 10.3842/SIGMA.2010.010