AbstractLet {pν}ν∈N0,pν∈Πν⧹Πν-1, be a sequence of polynomials, generated by a three-term recurrence relation.Shifting the recurrence coefficients of the elements of {pν}ν∈N0 we get a sequence of so-called associated polynomials, which play an important role in the theory of orthogonal polynomials. We generalize this concept of associating for arbitrary polynomials vn∈Πn. Especially, if vn is expanded in terms of pν,ν=0,…,n, their associated polynomials are Clenshaw polynomials which are used in numerical mathematics. As a consequence of it we present some results from the viewpoint of associated polynomials and from the viewpoint of Clenshaw polynomials.Analogously as for orthogonal polynomials we define functions of second kind for vn. We ...
7 pages, no figures.-- MSC2000 codes: 33C45; 42C05.-- Issue title: "Special Functions, Information T...
AbstractIn the introduction, the main object of the paper, namely, the calculation and study of the ...
AbstractIn this work, the coefficients of orthogonal polynomials are obtained in closed form. Our fo...
AbstractLet {pν}ν∈N0,pν∈Πν⧹Πν-1, be a sequence of polynomials, generated by a three-term recurrence ...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractA survey is given of the interaction between orthogonal polynomials, associated polynomials ...
13 pages, no figures.-- MSC2000 codes: 42C05.MR#: MR2010273 (2004i:33014)Zbl#: Zbl 1029.42014Let $\{...
AbstractLet {Pn} be a sequence of polynomials orthogonal with respect a linear functional u and {Qn}...
To every polynomial P of degree n we associate a sequence of n-1 polynomials of increasing degree wh...
This contribution aims to obtain several connection formulae for the polynomial sequence, which is o...
AbstractIt is shown that the polynomials {Lnα,M0,M1,…,MN(x)}n = 0∞ defined by Lnα,M0M1,…,MN(x)=∑k=0N...
AbstractBy considering a family of orthogonal polynomials generalizing the Tchebycheff polynomials o...
AbstractWe consider a class of polynomials Qn(x) defined by Qn(x) = (x + bn) Pn−1 (x) + dnPn (x), n ...
AbstractWe study polynomials orthogonal on a uniform grid. We show that each weight function gives t...
AbstractGiven {Pn}n≥0 a sequence of monic orthogonal polynomials, we analyze their linear combinatio...
7 pages, no figures.-- MSC2000 codes: 33C45; 42C05.-- Issue title: "Special Functions, Information T...
AbstractIn the introduction, the main object of the paper, namely, the calculation and study of the ...
AbstractIn this work, the coefficients of orthogonal polynomials are obtained in closed form. Our fo...
AbstractLet {pν}ν∈N0,pν∈Πν⧹Πν-1, be a sequence of polynomials, generated by a three-term recurrence ...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractA survey is given of the interaction between orthogonal polynomials, associated polynomials ...
13 pages, no figures.-- MSC2000 codes: 42C05.MR#: MR2010273 (2004i:33014)Zbl#: Zbl 1029.42014Let $\{...
AbstractLet {Pn} be a sequence of polynomials orthogonal with respect a linear functional u and {Qn}...
To every polynomial P of degree n we associate a sequence of n-1 polynomials of increasing degree wh...
This contribution aims to obtain several connection formulae for the polynomial sequence, which is o...
AbstractIt is shown that the polynomials {Lnα,M0,M1,…,MN(x)}n = 0∞ defined by Lnα,M0M1,…,MN(x)=∑k=0N...
AbstractBy considering a family of orthogonal polynomials generalizing the Tchebycheff polynomials o...
AbstractWe consider a class of polynomials Qn(x) defined by Qn(x) = (x + bn) Pn−1 (x) + dnPn (x), n ...
AbstractWe study polynomials orthogonal on a uniform grid. We show that each weight function gives t...
AbstractGiven {Pn}n≥0 a sequence of monic orthogonal polynomials, we analyze their linear combinatio...
7 pages, no figures.-- MSC2000 codes: 33C45; 42C05.-- Issue title: "Special Functions, Information T...
AbstractIn the introduction, the main object of the paper, namely, the calculation and study of the ...
AbstractIn this work, the coefficients of orthogonal polynomials are obtained in closed form. Our fo...