On the sharp Jackson-Nikol’skii inequality for algebraic polynomials on a multidimensional Euclidean sphere

The best constant C _n,m in the Jackson-Nikol’skii inequality between the uniform and integral norms of algebraic polynomials of a given total degree n ≥ 0 on the unit sphere \(\mathbb{S}^{m - 1} \) of the Euclidean space ? ^m is studied. Two-sided estimates for the constant C _n,m are obtained, which, in particular, give the order n ^m?1 of its behavior with respect to n as n → +∞ for a fixed m.     

On the sharp Jackson-Nikol’skii inequality for algebraic polynomials on a multidimensional Euclidean sphere

The best constant C _n,m in the Jackson-Nikol’skii inequality between the uniform and integral norms of algebraic polynomials of a given total degree n ≥ 0 on the unit sphere $ \mathbb{S}^{m - 1} $ \mathbb{S}^{m - 1} of the Euclidean space ℝ ^m is studied. Two-sided estimates for the constant C _n,m are obtained, which, in particular, give the order n ^m−1 of its behavior with respect to n as n → +∞ for a fixed m.     

Nikol’skii’s inequality for different metrics and properties of the sequence of norms of the Fourier sums of a function in the Lorentz space

Let (X, Y) be a pair of normed spaces such that X ? Y ? L ₁[0, 1] ⁿ and {e _k } _k be an expanding sequence of finite sets in ? ⁿ with respect to a scalar or vector parameter k, k ∈ ? or k ∈ ? ⁿ . The properties of the sequence of norms $\{ \left\| {S_{e_k } (f)} \right\|x\} _k $ of the Fourier sums of a fixed function f ∈ Y are studied. As the spaces X and Y, the Lebesgue spaces L _p [0, 1], the Lorentz spaces L _p,q [0, 1], L _p,q [0, 1] ⁿ , and the anisotropic Lorentz spaces L _p,q*[0, 1] ⁿ are considered. In the one-dimensional case, the sequence {e _k } _k consists of segments, and in the multidimensional case, it is a sequence of hyperbolic crosses or parallelepipeds in ? ⁿ . For trigonometric polynomials with the spectrum given by step hyperbolic crosses and parallelepipeds, various types of inequalities for different metrics in the Lorentz spaces L _p,q [0, 1] ⁿ and L _p,q*[0, 1] ⁿ are obtained.     

Relations between mixed moduli of smoothness,and embedding theorems for Nikol’skii classes

We prove (L _p , L _q ) inequalities for mixed moduli of smoothness of positive orders. As corollaries, we obtain embedding theorems for the Nikol’skii classes.     

On Nikol’skii Inequalities for Domains in $${\mathbb {R}}^d$$

Nikol’skii inequalities for various sets of functions, domains, and weights will be discussed. Much of the work is dedicated to the class of algebraic polynomials of total degree n on a bounded convex domain D. That is, we study \(\sigma := \sigma (D,d)\) for which

$$\begin{aligned} \Vert P\Vert _{L_q(D)}\le c n^{\sigma (\frac{1}{p}-\frac{1}{q})}\Vert P\Vert _{L_p(D)},\quad 0<p\le q\le \infty , \end{aligned}$$

where P is a polynomial of total degree n. We use geometric properties of the boundary of D to determine \(\sigma (D,d)\) with the aid of comparison between domains. Computing the asymptotics of the Christoffel function of various domains is crucial in our investigation. The methods will be illustrated by the numerous examples in which the optimal \(\sigma (D,d)\) will be computed explicitly.

     

The ortho-diameters of Nikol’skii and Besov classes in the Lorentz spaces

In this paper we estimate the order of approximation of S. M. Nikol’skii and O. V. Besov classes in the norm of the anisotropic Lorentz space. We also obtain bounds for ortho-diameters of these classes.     

Variations on a theorem of Arhangel’skii and Pytkeev

We identify continuous real-valued functions on a Tychonoff space X with their (closed) graphs thus allowing for C(X) to naturally inherit the lower Vietoris topology from the ambient hyperspace. We then calculate a bitopological version of tightness using the weak Lindelöf numbers of finite powers of X. We also characterize bitopological versions of countable fan and strong fan tightness of the point-open topology with respect to the lower Vietoris topology on C(X) in terms of suitable covering properties of the powers X ⁿ formulated using the language of S ₁ and S _fin selection principles.     

A note on Jensen’s inequality for BSDEs

Under the Lipschitz assumption and square integrable assumption on g, Jiang proved that Jensen＇s inequality for BSDEs with generator g holds in general if and only if g is independent of y, g is super homogenous in z and g（t, 0） = 0, a.s., a.e.. In this paper, based on Jiang＇s results, under the same assumptions as Jiang＇s, we investigate the necessary and sufficient condition on g under which Jensen＇s inequality for BSDEs with generator g holds for some specific convex functions, which generalizes some known results on Jensen＇s inequality for BSDEs.     

An Alexandrov–Fenchel-type inequality for hypersurfaces in the sphere

We find a monotone quantity along the inverse mean curvature flow and use it to prove an Alexandrov–Fenchel-type inequality for strictly convex hypersurfaces in the n-dimensional sphere, \(n \ge 3\).     

The Bernstein-Szegö inequality for fractional derivatives of trigonometric polynomials

On the set F _n of trigonometric polynomials of degree n ≥ 1 with complex coefficients, we consider the Szegö operator \(D_\theta ^\alpha \) defined by the relation \(D_\theta ^\alpha f_n (t) = \cos \theta D^\alpha f_n (t) - \sin \theta D^\alpha \tilde f_n (t)\) for α, θ ∈ ?, where α ≥ 0. Here, \(D^\alpha f_n \) and \(D^\alpha \tilde f_n \) are the Weyl fractional derivatives of (real) order α of the polynomial f _n and of its conjugate \(\tilde f_n \). In particular, we prove that, if α ≥ n ln 2n, then, for any θ ∈ ?, the sharp inequality \(\left\| {\cos \theta D^\alpha f_n - \sin \theta D^\alpha f_n } \right\|_{L_p } \leqslant n^\alpha \left\| {f_n } \right\|_{L_p } \) holds on the set F _n in the spaces L _p for all p ≥ 0. For classical derivatives (of integer order α ≥ 1), this inequality was obtained by Szegö in the uniform norm (p = ∞) in 1928 and by Zygmund for 1 ≤ p < ∞ in 1931–1935. For fractional derivatives of (real) order α ≥ 1 and 1 ≤ p ≤ ∞, the inequality was proved by Kozko in 1998.     

On the constant and step in Jackson’s inequality for best approximations by trigonometric polynomials and by Haar polynomials

We consider the C*-algebra generated by multidimensional integral operators with (?n)th-order homogeneous kernels and by the operators of multiplication by oscillating coefficients of the form |x|^iα. For this algebra, we construct an operator symbolic calculus and obtain necessary and sufficient conditions for the Fredholm property of an operator in terms of this calculus.