Orthonormal polynomial basis in local Dirichlet spaces
- 1 December 2021
- journal article
- research article
- Published by Springer Science and Business Media LLC in Acta Scientiarum Mathematicarum
- Vol. 87 (3-4), 595-613
- https://doi.org/10.14232/actasm-021-465-4
Abstract
We provide an orthogonal basis of polynomials for the local Dirichlet space D-zeta. These polynomials have numerous interesting features and a very unique algebraic pattern. We obtain the recurrence relation, the generating function, a simple formula for their norm, and explicit formulae for the distance and the orthogonal projection onto the subspace of polynomials of degree at most n. The latter implies a new polynomial approximation scheme in local Dirichlet spaces. Orthogonal polynomials in a harmonically weighted Dirichlet space, created by a finitely supported singular measure, are also studied.Keywords
This publication has 21 references indexed in Scilit:
- A note on Dirichlet-type spaces and cyclic vectors in the unit ball of $${\mathbb{C}^2}$$ C 2Archiv der Mathematik, 2015
- Which de Branges–Rovnyak spaces are Dirichlet spaces (and vice versa)?Journal of Functional Analysis, 2013
- Carleson measures and reproducing kernel thesis in Dirichlet-type spacesSt. Petersburg Mathematical Journal, 2013
- Fine Boundary Behavior and Invariant Subspaces of Harmonically Weighted Dirichlet SpacesComplex Analysis and Operator Theory, 2010
- De Branges–Rovnyak spaces and Dirichlet spacesJournal of Functional Analysis, 2010
- Multipliers and Carleson Measures for $ D(\mu) $Integral Equations and Operator Theory, 2003
- Hilbert spaces of analytic functions between the Hardy and the Dirichlet spaceProceedings of the American Mathematical Society, 1992
- A representation theorem for cyclic analytic two-isometriesTransactions of the American Mathematical Society, 1991
- A formula for the local Dirichlet integral.The Michigan Mathematical Journal, 1991
- Cyclic vectors in the Dirichlet spaceTransactions of the American Mathematical Society, 1984