Coherent pairs of measures of the second kind on the real line and Sobolev orthogonal polynomials. An application to a Jacobi case
Nenhuma Miniatura disponível
Data
2023-01-01
Orientador
Coorientador
Pós-graduação
Curso de graduação
Título da Revista
ISSN da Revista
Título de Volume
Editor
Tipo
Artigo
Direito de acesso
Resumo
The aim here is to consider the orthogonal polynomials (Formula presented.) with respect to an inner product of the type (Formula presented.), where (Formula presented.) and (Formula presented.) is a coherent pair of positive measures of the second kind on the real line (CPPM2K on the real line). Properties of (Formula presented.) and the connection formulas they satisfy with the orthogonal polynomials associated with the measure ν0 are analyzed. It is also shown that the zeros of (Formula presented.) are the eigenvalues of a matrix, which is a single line modification of the (Formula presented.) Jacobi matrix associated with the measure ν0. The paper also looks at a special example of a CPPM2K on the real line, where one of the measures is the Jacobi measure, and provides a much more detailed study of the properties of the orthogonal polynomials and the corresponding connection coefficients. In particular, the relation that these connection coefficients have with the Wilson polynomials is exposed.
Descrição
Palavras-chave
Idioma
Inglês
Como citar
Studies in Applied Mathematics.