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zbMath0578.20041MaRDI QIDQ3699921

Dennis W. Stanton

Publication date: 1984

Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.

zbMATH Keywords

Weyl groups orthogonal polynomials symmetric spaces difference operators Krawtchouk polynomials Chevalley groups over finite fields

Mathematics Subject Classification ID

Linear algebraic groups over finite fields (20G40) Orthogonal polynomials and functions of hypergeometric type (Jacobi, Laguerre, Hermite, Askey scheme, etc.) (33C45) Graphs and abstract algebra (groups, rings, fields, etc.) (05C25) Combinatorial aspects of finite geometries (05B25) Spherical harmonics (33C55)

Related Items (22)

\(q\)-rotations and Krawtchouk polynomials ⋮ Géza Freud, orthogonal polynomials and Christoffel functions. A case study ⋮ The nearest neighbor random walk on subspaces of a vector space and rate of convergence ⋮ Strong uniform times and finite random walks ⋮ Spectral analysis of finite Markov chains with spherical symmetries ⋮ Trees, wreath products and finite Gelfand pairs ⋮ Harmonic analysis of the space of \(S_a\times S_b\times S_c\)-invariant vectors in the irreducible representations of the symmetric group. ⋮ A fast Fourier transform for the Johnson graph ⋮ Designs, groups and lattices ⋮ Geometric representations of \(\text{GL}(n,R)\), cellular Hecke algebras and the embedding problem. ⋮ The spectrum of symmetric Krawtchouk matrices ⋮ Two stochastic models of a random walk in the \(\mathrm U(n)\)-spherical duals of \(U(n+1)\) ⋮ The space \(L^2\) on semi-infinite Grassmannian over finite field ⋮ Shuffling large decks of cards and the Bernoulli-Laplace urn model ⋮ From \(p\)-adic to real Grassmannians via the quantum ⋮ Zeros of generalized Krawtchouk polynomials ⋮ Invariant Semidefinite Programs ⋮ Efficient Computation of the Fourier Transform on Finite Groups ⋮ Commutative association schemes ⋮ Rook Theory of the Finite General Linear Group ⋮ 𝑞-Krawtchouk polynomials as spherical functions on the Hecke algebra of type 𝐵 ⋮ Symmetry stabilization for fast discrete monomial transforms and polynomial evaluation

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