Add to ORKGRecently the author initiated a novel approach to varying exponent Lebesgue space $L^{p(\cdot)}$ norms. In this approach the norm is defined by means of weak solutions to suitable first order ordinary differential equations (ODE). The resulting norm is equivalent with constant $2$ to a corresponding Nakano norm but the norms do not coincide in general and thus their isometric properties are different. In this paper the duality of these ODE-determined $L^{p(\cdot)}$ spaces is investigated. It turns out that the duality of the classical $L^p$ spaces generalizes nicely to this class of spaces. Here the duality pairing and Hölder's inequality work in the isometric sense which is a notable feature of these spaces. The uniform convexity and smoot...
Abstract. We show that many classical operators in harmonic analysis|such as maximal operators, sing...
International audienceLet T be a bounded linear operator on L p. We study the rate of growth of the ...
This book provides an accessible introduction to the theory of variable Lebesgue spaces. These space...
We extend the algebraic construction of finite dimensional varying exponent Lp(·) space norms, defin...
We extend the algebraic construction of finite dimensional varying exponent Lp(·) space norms, defin...
We investigate certain recently introduced ODE-determined varying exponent Lp spaces. It turns out t...
We provide a representation of elements of the space lp(A,X) for a locally convex space X and 1≤p<∞ ...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We investigate certain recently introduced ODE-determined varying exponent spaces. It turns out that...
In this paper we characterize the dual $\bigl(\B^c_{p(\cdot)} (\Omega) \bigr)'$ of the variable exp...
Given a space of homogeneous type \((X,d,\mu)\), we prove strong-type weighted norm inequalities for...
A version of the Lebesgue differentiation theorem is offered, where the $L^p$ norm is replaced with ...
Abstract. We show that many classical operators in harmonic analysis|such as maximal operators, sing...
International audienceLet T be a bounded linear operator on L p. We study the rate of growth of the ...
This book provides an accessible introduction to the theory of variable Lebesgue spaces. These space...
We extend the algebraic construction of finite dimensional varying exponent Lp(·) space norms, defin...
We extend the algebraic construction of finite dimensional varying exponent Lp(·) space norms, defin...
We investigate certain recently introduced ODE-determined varying exponent Lp spaces. It turns out t...
We provide a representation of elements of the space lp(A,X) for a locally convex space X and 1≤p<∞ ...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We show that many classical operators in harmonic analysis ---such as maximal operators, singular in...
We investigate certain recently introduced ODE-determined varying exponent spaces. It turns out that...
In this paper we characterize the dual $\bigl(\B^c_{p(\cdot)} (\Omega) \bigr)'$ of the variable exp...
Given a space of homogeneous type \((X,d,\mu)\), we prove strong-type weighted norm inequalities for...
A version of the Lebesgue differentiation theorem is offered, where the $L^p$ norm is replaced with ...
Abstract. We show that many classical operators in harmonic analysis|such as maximal operators, sing...
International audienceLet T be a bounded linear operator on L p. We study the rate of growth of the ...
This book provides an accessible introduction to the theory of variable Lebesgue spaces. These space...