Asymptotic behaviour of orthogonal polynomials relative to measures with mass points
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Publication:4287333
DOI10.1112/S0025579300007099zbMath0791.42016MaRDI QIDQ4287333
Francisco J. Ruiz, Juan Luis Varona, José J. Guadalupe Hernandez, Mario Pérez Riera
Publication date: 12 May 1994
Published in: Mathematika (Search for Journal in Brave)
Fourier series in special orthogonal functions (Legendre polynomials, Walsh functions, etc.) (42C10)
Related Items (max. 100)
Connection formulas for general discrete Sobolev polynomials: Mehler-Heine asymptotics ⋮ On the Uvarov modification of two variable orthogonal polynomials on the disk ⋮ Weighted norm inequalities for polynomial expansions associated to some measures with mass points ⋮ Using \(\mathcal D\)-operators to construct orthogonal polynomials satisfying higher order difference or differential equations ⋮ Asymptotic formulae for generalized Freud polynomials ⋮ Zeros of orthogonal polynomials generated by canonical perturbations of measures ⋮ Orthogonal polynomials in several variables for measures with mass points ⋮ Using \(\mathcal D\)-operators to construct orthogonal polynomials satisfying higher order \(q\)-difference equations ⋮ Estimates for jacobi—sobolev type orthogonal polynomials ⋮ Estimates of polynomials orthogonal with respect to the Legendre-Sobolev inner product ⋮ Krall-type orthogonal polynomials in several variables
Cites Work
- Extensions of Szegö's theory of orthogonal polynomials. II
- Orthogonal polynomials: Their growth relative to their sums
- CONVERGENCE IN THE MEAN AND ALMOST EVERYWHERE OF FOURIER SERIES IN POLYNOMIALS ORTHOGONAL ON AN INTERVAL
- ON THE ASYMPTOTICS OF THE RATIO OF ORTHOGONAL POLYNOMIALS
- Orthogonal Polynomials With Weight Function (1 - x)α( l + x)β + Mδ(x + 1) + Nδ(x - 1)
- Mean Convergence of Expansions in Laguerre and Hermite Series
- Mean Convergence of Jacobi Series
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