Title of article
On inverse problem leading to second-order linear functionals Original Research Article
Author/Authors
Ridha Sfaxi، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
9
From page
678
To page
686
Abstract
A linear functional LL is said to be positive-definite if and only if 〈L,p2〉>0〈L,p2〉>0, for all non-zero polynomials with real coefficients pp. In this paper, we provide a new construction process of a positive-definite linear functional from positive-definite linear functional data. Indeed, for any non-zero real ϵϵ and any positive-definite linear functional LL, we show that the linear functional LϵLϵ satisfying View the MathML sourceLϵ−ϵLϵ′=L is also positive-definite. This process allows us to construct a second-order positive-definite linear functional from a semiclassical positive-definite linear functional. Finally, we give an illustrative example.
Keywords
orthogonal polynomials , Recurrence relations , Integral representations , Semiclassical linear functionals , Second-order linear functionals , Laguerre polynomials
Journal title
Journal of Approximation Theory
Serial Year
2010
Journal title
Journal of Approximation Theory
Record number
852768
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