Add to ORKGIn the context of a strongly local Dirichlet space we show that if a function mapping the real line to itself (and fixing the origin) operates by composition on the left to map the Dirichlet space into itself, then the function is necessarily locally Lipschitz continuous. If, in addition, the Dirichlet space contains unbounded elements, then the function must be globally Lipschitz continuous. The proofs rely on a co-area formula for condenser potentials
In this paper we address some of the most fundamental questions regarding the differentiability stru...
summary:We give a characterization of the globally Lipschitzian composition operators acting in the ...
For an arbitrary open set Ω ⊂ ℝn we characterize all functions G on the real line such that G o u ∈ ...
AbstractEvery Borel function f : R → R defines a self-map of the space of measurable functions on a ...
We characterize the entire functions ℓfor which the induced nonlinear superposition operator f →ℓof ...
It is known that every locally defined operator acting between two Hölder spaces is a Nemytskii supe...
We give sufficient conditions for a homogeneous superposition operator to be a continuous mapping be...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
Abstract. In [11] an example presented a Hausdorff continuous, u.s.c. and l.s.c. multifunction from ...
Let \u3a9 be an open connected subset of R^n for which the Poincare' inequality holds. We consider t...
AbstractWe consider the Cauchy problem for a single conservation law in several space variables. Let...
In this paper we present a necessary condition for an autonomous superposition operator to act in th...
summary:Necessary and sufficient conditions are given for the reflected Cauchy's operator (the refle...
In this paper we introduce natural metrics in the hyperbolic Bloch and QK-type spaces with respect t...
In this paper we characterize those functions $f$ of the real line to itself, such that the nonli...
In this paper we address some of the most fundamental questions regarding the differentiability stru...
summary:We give a characterization of the globally Lipschitzian composition operators acting in the ...
For an arbitrary open set Ω ⊂ ℝn we characterize all functions G on the real line such that G o u ∈ ...
AbstractEvery Borel function f : R → R defines a self-map of the space of measurable functions on a ...
We characterize the entire functions ℓfor which the induced nonlinear superposition operator f →ℓof ...
It is known that every locally defined operator acting between two Hölder spaces is a Nemytskii supe...
We give sufficient conditions for a homogeneous superposition operator to be a continuous mapping be...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
Abstract. In [11] an example presented a Hausdorff continuous, u.s.c. and l.s.c. multifunction from ...
Let \u3a9 be an open connected subset of R^n for which the Poincare' inequality holds. We consider t...
AbstractWe consider the Cauchy problem for a single conservation law in several space variables. Let...
In this paper we present a necessary condition for an autonomous superposition operator to act in th...
summary:Necessary and sufficient conditions are given for the reflected Cauchy's operator (the refle...
In this paper we introduce natural metrics in the hyperbolic Bloch and QK-type spaces with respect t...
In this paper we characterize those functions $f$ of the real line to itself, such that the nonli...
In this paper we address some of the most fundamental questions regarding the differentiability stru...
summary:We give a characterization of the globally Lipschitzian composition operators acting in the ...
For an arbitrary open set Ω ⊂ ℝn we characterize all functions G on the real line such that G o u ∈ ...