scientific article; zbMATH DE number 5238382
From MaRDI portal
Publication:5443945
zbMath1151.33008arXivmath/0606085MaRDI QIDQ5443945
Andrei Okounkov, Grigori Olshanski
Publication date: 22 February 2008
Full work available at URL: https://arxiv.org/abs/math/0606085
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Harmonic analysis and spherical functions (43A90) Orthogonal polynomials and functions associated with root systems (33C52)
Related Items (24)
Characters of infinite-dimensional quantum classical groups: BCD cases ⋮ Markov processes on the duals to infinite-dimensional classical Lie groups ⋮ Multivariate Jacobi polynomials and the Selberg integral. II ⋮ Harmonic analysis on the infinite-dimensional unitary-symplectic group ⋮ Multivariate Jacobi polynomials and the Selberg integral ⋮ \(q\)-deformed character theory for infinite-dimensional symplectic and orthogonal groups ⋮ Superconformal blocks in diverse dimensions and \textit{BC} symmetric functions ⋮ Euler characters and super Jacobi polynomials ⋮ Skew Howe duality and limit shapes of Young diagrams ⋮ Unnamed Item ⋮ The \(q\)-Gelfand-Tsetlin graph, Gibbs measures and \(q\)-Toeplitz matrices ⋮ An orthogonality relation for multivariable Bessel polynomials ⋮ Random surface growth with a wall and Plancherel measures for O (∞) ⋮ Random surface growth and Karlin-McGregor polynomials ⋮ Separation of variables for symplectic characters ⋮ Hard-edge asymptotics of the Jacobi growth process ⋮ BC type \(z\)-measures and determinantal point processes ⋮ Macdonald polynomials and extended Gelfand-Tsetlin graph ⋮ \(BC_\infty \) Calogero-Moser operator and super Jacobi polynomials ⋮ Moments of the Hermitian matrix Jacobi process ⋮ Grigori Iosifovich Olshanski ⋮ A nonsymmetric version of Okounkov's BC-type interpolation Macdonald polynomials ⋮ Asymptotics of symmetric polynomials with applications to statistical mechanics and representation theory ⋮ Representations of classical Lie groups and quantized free convolution
This page was built for publication:
