AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous function to be of class Ck are discussed. Also, relationships between the distribution of zeros of polynomials of best uniform or Lp approximation to a given function and its differential properties are established
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractBernstein–Markov-type inequalities provide estimates for the norms of derivatives of algebra...
AbstractGiven a function f, uniform limit of analytic polynomials on a compact, regular set E⊂CN, we...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractIn this paper we give two non-trivial generalizations of a classical Bernstein inequality wh...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractIt is shown that if E is a C∞ determining compact set in Rn, then Markov's inequality for de...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractWe show that for any function ϑ: N → R+ one can find a Cantor set C and a trigonometric poly...
AbstractLet W := e−q, where QR→R is even, sufficiently smooth, and of faster than polynomial growth ...
In an answer to a question raised by chemist Mendeleev, A. Markov proved that if is a real polynom...
In this expository paper we will give a survey of some recent results concerning discretization of u...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractBernstein–Markov-type inequalities provide estimates for the norms of derivatives of algebra...
AbstractGiven a function f, uniform limit of analytic polynomials on a compact, regular set E⊂CN, we...
AbstractOn compact sets preserving Markov's inequality, Bernstein-type conditions for a continuous f...
AbstractIn this paper we give two non-trivial generalizations of a classical Bernstein inequality wh...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
The Bernstein Markov Property for a compact set E and a positive finite mea- sure μ supported on E ...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractIt is shown that if E is a C∞ determining compact set in Rn, then Markov's inequality for de...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractThere is given a completion to Theorem 3.3 of [11] by showing that on compact subsets of RN ...
AbstractWe show that for any function ϑ: N → R+ one can find a Cantor set C and a trigonometric poly...
AbstractLet W := e−q, where QR→R is even, sufficiently smooth, and of faster than polynomial growth ...
In an answer to a question raised by chemist Mendeleev, A. Markov proved that if is a real polynom...
In this expository paper we will give a survey of some recent results concerning discretization of u...
AbstractFor a polynomial Pn of total degree n and a bounded convex set S it will be shown that for 0...
AbstractBernstein–Markov-type inequalities provide estimates for the norms of derivatives of algebra...
AbstractGiven a function f, uniform limit of analytic polynomials on a compact, regular set E⊂CN, we...
DOI
Add to ORKG