AbstractWe associate to every function space, and to every entropy function E, a scale of spaces Λp,q(E) similar to the classical Lorentz spaces Lp,q. Necessary and sufficient conditions for they to be normed spaces are proved, their role in real interpolation theory is analyzed, and a number of applications to functional and interpolation properties of several variants of Lorentz spaces and entropy spaces are given
Using one-sided Steklov means, we introduce a new modulus of smoothness in weighted Lorentz spaces....
Sharp estimates are obtained for the rates of blow up of the norms of embeddings of Besov spaces bs ...
We study mapping properties of the centered Hardy--Littlewood maximal operator $\mathcal M$ acting o...
summary:In this paper, we prove new embedding theorems for generalized anisotropic Sobolev spaces, $...
AbstractSome geometric properties of classical Lorentz spaces Λ1,w are considered. First criteria fo...
We determine the associate space of the logarithmic interpolation space (X0, X1)1,q,A where X0 and X...
AbstractThe sharp asymptotics for the (metric) entropy numbers of large ellipsoids in a Hilbert spac...
AbstractWe associate to every function space, and to every entropy function E, a scale of spaces Λp,...
AbstractUnder some non-degeneracy condition we show that sequences of entropy solutions of a semi-li...
Extending several works, we prove a general Adams-Moser-Trudinger type inequality for the embedding ...
Gibbs measure which are also called Sinai-Ruelle-Bowen Measure describe asymptotic behavior and stat...
AbstractIn this paper we consider Lorentz type spaces Lσp,r defined in terms of iterated rearrangeme...
AbstractWhen Hardy–Littlewood maximal operator is bounded on Lp(⋅)(Rn) space we prove [Lp(⋅)(Rn),BMO...
We investigate the approximation properties of trigonometric polynomials and prove some direct and i...
Given a sublinear operator T satisfying that T f Lp (ν) ≤ C p−1 f Lp (µ), for every 1 0 1 + log+ r M...
Using one-sided Steklov means, we introduce a new modulus of smoothness in weighted Lorentz spaces....
Sharp estimates are obtained for the rates of blow up of the norms of embeddings of Besov spaces bs ...
We study mapping properties of the centered Hardy--Littlewood maximal operator $\mathcal M$ acting o...
summary:In this paper, we prove new embedding theorems for generalized anisotropic Sobolev spaces, $...
AbstractSome geometric properties of classical Lorentz spaces Λ1,w are considered. First criteria fo...
We determine the associate space of the logarithmic interpolation space (X0, X1)1,q,A where X0 and X...
AbstractThe sharp asymptotics for the (metric) entropy numbers of large ellipsoids in a Hilbert spac...
AbstractWe associate to every function space, and to every entropy function E, a scale of spaces Λp,...
AbstractUnder some non-degeneracy condition we show that sequences of entropy solutions of a semi-li...
Extending several works, we prove a general Adams-Moser-Trudinger type inequality for the embedding ...
Gibbs measure which are also called Sinai-Ruelle-Bowen Measure describe asymptotic behavior and stat...
AbstractIn this paper we consider Lorentz type spaces Lσp,r defined in terms of iterated rearrangeme...
AbstractWhen Hardy–Littlewood maximal operator is bounded on Lp(⋅)(Rn) space we prove [Lp(⋅)(Rn),BMO...
We investigate the approximation properties of trigonometric polynomials and prove some direct and i...
Given a sublinear operator T satisfying that T f Lp (ν) ≤ C p−1 f Lp (µ), for every 1 0 1 + log+ r M...
Using one-sided Steklov means, we introduce a new modulus of smoothness in weighted Lorentz spaces....
Sharp estimates are obtained for the rates of blow up of the norms of embeddings of Besov spaces bs ...
We study mapping properties of the centered Hardy--Littlewood maximal operator $\mathcal M$ acting o...