AbstractThe Lp norm of the Hilbert transform of the characteristic function of a set is invariant with respect to the structure of the set: it can be written as an explicit function of its Lebesgue measure and of the exponent p. We show that more is true: there is a fixed ratio, only dependent on p, between the Lp norms of such a Hilbert transform computed on the given set and on the whole line
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
AbstractBased on the celebrated Hermite–Hadamard integral inequality for convex functions, some ineq...
AbstractWe give an alternative proof of a theorem of Stein and Weiss: The distribution function of t...
AbstractIn this paper, the norm of a Hilbert's type linear operator T:lr→lr (r>1;r=p,q) is given. As...
AbstractIn this paper, we generalize Cerone’s results, and a unified treatment of error estimates fo...
AbstractThe goal of this article is to introduce an analogue of the Paley–Wiener space of bandlimite...
AbstractBy introducing two pairs of conjugate exponents and estimating the weight coefficients, we g...
AbstractWe present the best constant and the extremal functions for an Improved Hardy–Sobolev inequa...
AbstractWe generalize Ostrowski inequality for higher order derivatives, by using a generalized Eule...
Let e be a homogeneous subset of R in the sense of Carleson. Let μ be a finite positive measure on R...
In the present work we prove some direct theorems of the approximation theory in the weighted Orlicz...
AbstractIn this paper we consider two elliptic problems. The first one is a Dirichlet problem while ...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
AbstractThe aim of this paper is to refine Gurland’s formula for approximating pi. We prove the comp...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
AbstractBased on the celebrated Hermite–Hadamard integral inequality for convex functions, some ineq...
AbstractWe give an alternative proof of a theorem of Stein and Weiss: The distribution function of t...
AbstractIn this paper, the norm of a Hilbert's type linear operator T:lr→lr (r>1;r=p,q) is given. As...
AbstractIn this paper, we generalize Cerone’s results, and a unified treatment of error estimates fo...
AbstractThe goal of this article is to introduce an analogue of the Paley–Wiener space of bandlimite...
AbstractBy introducing two pairs of conjugate exponents and estimating the weight coefficients, we g...
AbstractWe present the best constant and the extremal functions for an Improved Hardy–Sobolev inequa...
AbstractWe generalize Ostrowski inequality for higher order derivatives, by using a generalized Eule...
Let e be a homogeneous subset of R in the sense of Carleson. Let μ be a finite positive measure on R...
In the present work we prove some direct theorems of the approximation theory in the weighted Orlicz...
AbstractIn this paper we consider two elliptic problems. The first one is a Dirichlet problem while ...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
AbstractThe aim of this paper is to refine Gurland’s formula for approximating pi. We prove the comp...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
Makarov's principle relates three characteristics of Bloch functions that resemble the variance of a...
AbstractBased on the celebrated Hermite–Hadamard integral inequality for convex functions, some ineq...
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