Please use this identifier to cite or link to this item: http://hdl.handle.net/10316/4582
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dc.contributor.authorJesus, M. N. de-
dc.contributor.authorPetronilho, J.-
dc.date.accessioned2008-09-01T11:34:44Z-
dc.date.available2008-09-01T11:34:44Z-
dc.date.issued2008-09-01T11:34:44Z-
dc.identifier.citationJournal of Mathematical Analysis and Applications. In Press, Corrected Proof:en_US
dc.identifier.urihttp://hdl.handle.net/10316/4582-
dc.description.abstractWe discuss an inverse problem in the theory of (standard) orthogonal polynomials involving two orthogonal polynomial families (Pn)n and (Qn)n whose derivatives of higher orders m and k (resp.) are connected by a linear algebraic structure relation such as for all n=0,1,2,..., where M and N are fixed nonnegative integer numbers, and ri,n and si,n are given complex parameters satisfying some natural conditions. Let u and v be the moment regular functionals associated with (Pn)n and (Qn)n (resp.). Assuming 0[less-than-or-equals, slant]m[less-than-or-equals, slant]k, we prove the existence of four polynomials [Phi]M+m+i and [Psi]N+k+i, of degrees M+m+i and N+k+i (resp.), such that the (k-m)th-derivative, as well as the left-product of a functional by a polynomial, being defined in the usual sense of the theory of distributions. If k=m, then u and v are connected by a rational modification. If k=m+1, then both u and v are semiclassical linear functionals, which are also connected by a rational modification. When k>m, the Stieltjes transform associated with u satisfies a non-homogeneous linear ordinary differential equation of order k-m with polynomial coefficients.en_US
dc.description.urihttp://www.sciencedirect.com/science/article/B6WK2-4SSNDCC-2/1/2844d686d4f273e5ddf7b4d7146c9ee6en_US
dc.format.mimetypeaplication/PDFen
dc.language.isoengeng
dc.rightsopenAccesseng
dc.subjectOrthogonal polynomialsen_US
dc.subjectInverse problemsen_US
dc.subjectSemiclassical orthogonal polynomialsen_US
dc.subjectStieltjes transformsen_US
dc.titleOn linearly related sequences of derivatives of orthogonal polynomialsen_US
dc.typearticleen_US
uc.controloAutoridadeSim-
item.fulltextCom Texto completo-
item.languageiso639-1en-
item.grantfulltextopen-
crisitem.author.deptFaculdade de Ciências e Tecnologia, Universidade de Coimbra-
crisitem.author.parentdeptUniversidade de Coimbra-
crisitem.author.researchunitCenter for Mathematics, University of Coimbra-
crisitem.author.orcid0000-0002-1413-3889-
Appears in Collections:FCTUC Matemática - Artigos em Revistas Internacionais
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