AbstractLet Pn be the class of algebraic polynomials of degree at most n. Some weighted L2-analogues of the Bernstein′s inequality for polynomials P ∈ Pn are investigated and a connection with the classical orthogonal polynomials is given
AbstractThere is a series of publications which have considered inequalities of Markov–Bernstein–Nik...
We show how symmetric orthogonal polynomials can be linked to polynomials associated with certain or...
AbstractVarious important weighted polynomial inequalities, such as Bernstein, Marcinkiewicz, Nikols...
AbstractLet Pn be the class of algebraic polynomials of degree at most n. Some weighted L2-analogues...
AbstractIn this paper we give a new characterization of the classical orthogonal polynomials (Hermit...
AbstractIn this paper we give a new characterization of the classical orthogonal polynomials (Hermit...
AbstractBernstein's classical theorem states that for a polynomialPof degree at mostn, max|z|=1|P′(z...
AbstractLet I=[0,d), where d is finite or infinite. Let Wρx=xρexp-Qx, where ρ>-12 and Q is continuou...
Bernstein\u27s classical theorem states that for a polynomialPof degree at mostn, maxz=1P′(z)≤nmaxz=...
Bernstein\u27s classical theorem states that for a polynomialPof degree at mostn, maxz=1P′(z)≤nmaxz=...
AbstractIn this paper we show that the orthogonal complement of a subspace in the polynomial space o...
AbstractLet wQ(x) = exp(−Q(x)) be a weight function and {Pn} the system of polynomials orthonormal w...
AbstractLet f(z)=a0φ0(z)+a1φ1(z)+…+anφn(z) be a polynomial of degree n, given as an orthogonal expan...
xi (1 − x)n−i, 0 ≤ i ≤ n, be the (classical) Bernstein basis of Pn in the interval [0, 1]. It has be...
AbstractLet W(x) = exp(− Q(x)) be a weight on the real line, with Q satisfying conditions typicaily ...
AbstractThere is a series of publications which have considered inequalities of Markov–Bernstein–Nik...
We show how symmetric orthogonal polynomials can be linked to polynomials associated with certain or...
AbstractVarious important weighted polynomial inequalities, such as Bernstein, Marcinkiewicz, Nikols...
AbstractLet Pn be the class of algebraic polynomials of degree at most n. Some weighted L2-analogues...
AbstractIn this paper we give a new characterization of the classical orthogonal polynomials (Hermit...
AbstractIn this paper we give a new characterization of the classical orthogonal polynomials (Hermit...
AbstractBernstein's classical theorem states that for a polynomialPof degree at mostn, max|z|=1|P′(z...
AbstractLet I=[0,d), where d is finite or infinite. Let Wρx=xρexp-Qx, where ρ>-12 and Q is continuou...
Bernstein\u27s classical theorem states that for a polynomialPof degree at mostn, maxz=1P′(z)≤nmaxz=...
Bernstein\u27s classical theorem states that for a polynomialPof degree at mostn, maxz=1P′(z)≤nmaxz=...
AbstractIn this paper we show that the orthogonal complement of a subspace in the polynomial space o...
AbstractLet wQ(x) = exp(−Q(x)) be a weight function and {Pn} the system of polynomials orthonormal w...
AbstractLet f(z)=a0φ0(z)+a1φ1(z)+…+anφn(z) be a polynomial of degree n, given as an orthogonal expan...
xi (1 − x)n−i, 0 ≤ i ≤ n, be the (classical) Bernstein basis of Pn in the interval [0, 1]. It has be...
AbstractLet W(x) = exp(− Q(x)) be a weight on the real line, with Q satisfying conditions typicaily ...
AbstractThere is a series of publications which have considered inequalities of Markov–Bernstein–Nik...
We show how symmetric orthogonal polynomials can be linked to polynomials associated with certain or...
AbstractVarious important weighted polynomial inequalities, such as Bernstein, Marcinkiewicz, Nikols...
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