DOIAbstract
AbstractUpper bounds of the exact order of magnitude in n are given for max−1⩽x⩽1|p′(x)|max−1⩽x⩽1|p(x)|for polynomials p of degree n, free of zeros in certain regions containing the interval (−1, 1)
AbstractUpper bounds of the exact order of magnitude in n are given for max−1⩽x⩽1|p′(x)|max−1⩽x⩽1|p(x)|for polynomials p of degree n, free of zeros in certain regions containing the interval (−1, 1)
AbstractLet Pnd denote the set of real algebraic polynomials of d variables and of total degree at m...
subsets of [−1,1] and [−π,π], respectively. The primary purpose of this noteis to extend Markov’sand...
Abstract. For an arbitrary entire function f and any r> 0, let M\u85 f; r : maxjzjr j f \u85zj. ...
AbstractUpper bounds of the exact order of magnitude in n are given for max−1⩽x⩽1|p′(x)|max−1⩽x⩽1|p(...
Essentially sharp Markov-type inequalities are known for various classes of polynomials with constra...
It is shown that c1 nmax{k +1,log n}# sup c 2 n max{k +1,log n} with absolute constants c1 &...
AbstractMarkov's inequality asserts that max−1⩽x⩽1|p′(x)|⩽n2max−1⩽x⩽1|p(x)| (1) for every polynomial...
Abstract. Let Fn denote the set of polynomials of degree at most n with coefficients from {−1, 0, 1}...
Abstract. We prove a few interesting inequalities for Lorentz polynomials. A highlight of this paper...
Abstract. We prove a few interesting inequalities for Lorentz polynomials. A highlight of this paper...
AbstractLet Fn denote the set of polynomials of degree at most n with coefficients from {−1,0, 1}. L...
Let D denote the unit disc of the complex plane and Pn the class of polynomials of degree at most n ...
AbstractLet p(z) = ∑v = 0navzv be a polynomial of degree n having no zeros in ¦z¦ < k, k ⩾ 1. Then w...
AbstractDenote by πn the set of all real algebraic polynomials of degree at most n and let Un≔{e-x2p...
AbstractIf P(z)=∑ν=0ncνzν is a polynomial of degree n having no zeros in |z|<1, then for |β|⩽1, it w...
AbstractLet Pnd denote the set of real algebraic polynomials of d variables and of total degree at m...
subsets of [−1,1] and [−π,π], respectively. The primary purpose of this noteis to extend Markov’sand...
Abstract. For an arbitrary entire function f and any r> 0, let M\u85 f; r : maxjzjr j f \u85zj. ...
AbstractUpper bounds of the exact order of magnitude in n are given for max−1⩽x⩽1|p′(x)|max−1⩽x⩽1|p(...
Essentially sharp Markov-type inequalities are known for various classes of polynomials with constra...
It is shown that c1 nmax{k +1,log n}# sup c 2 n max{k +1,log n} with absolute constants c1 &...
AbstractMarkov's inequality asserts that max−1⩽x⩽1|p′(x)|⩽n2max−1⩽x⩽1|p(x)| (1) for every polynomial...
Abstract. Let Fn denote the set of polynomials of degree at most n with coefficients from {−1, 0, 1}...
Abstract. We prove a few interesting inequalities for Lorentz polynomials. A highlight of this paper...
Abstract. We prove a few interesting inequalities for Lorentz polynomials. A highlight of this paper...
AbstractLet Fn denote the set of polynomials of degree at most n with coefficients from {−1,0, 1}. L...
Let D denote the unit disc of the complex plane and Pn the class of polynomials of degree at most n ...
AbstractLet p(z) = ∑v = 0navzv be a polynomial of degree n having no zeros in ¦z¦ < k, k ⩾ 1. Then w...
AbstractDenote by πn the set of all real algebraic polynomials of degree at most n and let Un≔{e-x2p...
AbstractIf P(z)=∑ν=0ncνzν is a polynomial of degree n having no zeros in |z|<1, then for |β|⩽1, it w...
AbstractLet Pnd denote the set of real algebraic polynomials of d variables and of total degree at m...
subsets of [−1,1] and [−π,π], respectively. The primary purpose of this noteis to extend Markov’sand...
Abstract. For an arbitrary entire function f and any r> 0, let M\u85 f; r : maxjzjr j f \u85zj. ...
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