On reverse Hardy's inequality.
On rough maximal operators and Marcinkiewicz integrals along submanifolds
We investigate the boundedness for a class of parametric Marcinkiewicz integral operators associated to submanifolds and a class of related maximal operators under the condition on the kernel functions. Our results improve and extend some known results.
On singular integrals and Orlicz spaces
On Singular Integrals, Multipliers, H1 and Fourier Series ? a Local Field Phenomenon.
On singular integrals of Calderón-type in Rn and BMO.
We prove Lp (and weighted Lp) bounds for singular integrals of the formp.v. ∫Rn E (A(x) - A(y) / |x - y|) (Ω(x - y) / |x - y|n) f(y) dy,where E(t) = cos t if Ω is odd, and E(t) = sin t if Ω is even, and where ∇ A ∈ BMO. Even in the case that Ω is smooth, the theory of singular integrals with rough kernels plays a key role in the proof. By standard techniques, the trigonometric function E can then be replaced by a large class of smooth functions F. Some related operators are also considered. As...
On singular integrals of functions in L¹
On singular integrals with respect to the gaussian measure
On some applications of Bochner-Schoenberg-Eberlein type theorems
On some classes of almost periodic functions in abstract spaces.
On some classes of distributions
On some constants in simultaneous approximation.
On some convexity properties in the Besicovitch-Musielak-Orlicz space of almost periodic functions with Luxemburg norm
In this article, it is shown that geometrical properties such as local uniform convexity, mid point local uniform convexity, H-property and uniform convexity in every direction are equivalent in the Besicovitch-Musielak-Orlicz space of almost periodic functions endowed with the Luxemburg norm.
On some equivalent geometric properties in the Besicovitch-Orlicz space of almost periodic functions with Luxemburg norm
The paper is concerned with the characterization and comparison of some local geometric properties of the Besicovitch-Orlicz space of almost periodic functions. Namely, it is shown that local uniform convexity, -property and strict convexity are all equivalent. In our approach, we first prove some metric type properties for the modular function associated to our space. These are then used to prove our main equivalence result.
On some expansions of p-adic functions
On some extremal problems in Bergman spaces in weakly pseudoconvex domains
We consider and solve extremal problems in various bounded weakly pseudoconvex domains in based on recent results on boundedness of Bergman projection with positive Bergman kernel in Bergman spaces in such type domains. We provide some new sharp theorems for distance function in Bergman spaces in bounded weakly pseudoconvex domains with natural additional condition on Bergman representation formula.
On some Extremal Problems of Landau
2000 Mathematics Subject Classification: Primary: 42A05. Secondary: 42A82, 11N05.The prime number theorem with error term presents itself as &pi'(x) = ∫2x [dt/ logt] + O ( x e- K logL x). In 1909, Edmund Landau provided a systematic analysis of the proof seeking better values of L and K. At a key point of his 1899 proof de la Vallée Poussin made use of the nonnegative trigonometric polynomial 2/3 (1+cos x)2 = 1+4/3 cosx +1/3 cos2x. Landau considered more general positive definite nonnegative...
On some new sharp embedding theorems in minimal and pseudoconvex domains
We present new sharp embedding theorems for mixed-norm analytic spaces in pseudoconvex domains with smooth boundary. New related sharp results in minimal bounded homogeneous domains in higher dimension are also provided. Last domains we consider are domains which are direct generalizations of the well-studied so-called bounded symmetric domains in Our results were known before only in the very particular case of domains of such type in the unit ball. As in the unit ball case, all our proofs are...
On some new sharp estimates in analytic Herz-type function spaces in tubular domains over symmetric cones
We obtain new sharp embedding theorems for mixed-norm Herz-type analytic spaces in tubular domains over symmetric cones. These results enlarge the list of recent sharp theorems in analytic spaces obtained by Nana and Sehba (2015).
On some properties of multiple conjugate trigonometric series.
On Some Properties of Segal Algebras and Their Multipliers.