DOIAbstract
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN (or CN) preserving Markov′s inequality, some speed of polynomial approximation leads to Lipschitz- and Zygmund-type classes of functions
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN (or CN) preserving Markov′s inequality, some speed of polynomial approximation leads to Lipschitz- and Zygmund-type classes of functions
Let D be the unit disc in the complex plane C and ‖ p ‖: = max z∈∂D | p(z) |, where p(z):= ∑n k=0 a...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
The well known Bernstein Inequallty states that if D is a disk centered at the origin with radius R ...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractIn this paper we complete some results of (J. Approx. Theory69 (1992), 156-166) and give a g...
subsets of [−1,1] and [−π,π], respectively. The primary purpose of this noteis to extend Markov’sand...
AbstractIn 1934 Kantorovitch modified the Bernstein polynomials Bn by means of metrical means to yie...
In this work we discuss generalizations of the classical Bernstein and Markov type inequalities for ...
In an answer to a question raised by chemist Mendeleev, A. Markov proved that if is a real polynom...
In this work we discuss generalizations of the classical Bernstein and Markov type inequalities for ...
AbstractLet W(x) = exp(− Q(x)) be a weight on the real line, with Q satisfying conditions typicaily ...
AbstractWe discuss Totik’s extension of the classical Bernstein theorem on polynomial approximation ...
Let D be the unit disc in the complex plane C and ‖ p ‖: = max z∈∂D | p(z) |, where p(z):= ∑n k=0 a...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
The well known Bernstein Inequallty states that if D is a disk centered at the origin with radius R ...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractIn this paper we complete some results of (J. Approx. Theory69 (1992), 156-166) and give a g...
subsets of [−1,1] and [−π,π], respectively. The primary purpose of this noteis to extend Markov’sand...
AbstractIn 1934 Kantorovitch modified the Bernstein polynomials Bn by means of metrical means to yie...
In this work we discuss generalizations of the classical Bernstein and Markov type inequalities for ...
In an answer to a question raised by chemist Mendeleev, A. Markov proved that if is a real polynom...
In this work we discuss generalizations of the classical Bernstein and Markov type inequalities for ...
AbstractLet W(x) = exp(− Q(x)) be a weight on the real line, with Q satisfying conditions typicaily ...
AbstractWe discuss Totik’s extension of the classical Bernstein theorem on polynomial approximation ...
Let D be the unit disc in the complex plane C and ‖ p ‖: = max z∈∂D | p(z) |, where p(z):= ∑n k=0 a...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
The well known Bernstein Inequallty states that if D is a disk centered at the origin with radius R ...
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