Add to ORKGIn the context of Dirichlet type spaces on the unit ball of $\mathbb{C}^d$, also known as Hardy-Sobolev or Besov-Sobolev spaces, we compare two notions of smallness for compact subsets of the unit sphere. We show that the functional analytic notion of being totally null agrees with the potential theoretic notion of having capacity zero. In particular, this applies to the classical Dirichlet space on the unit disc and logarithmic capacity. In combination with a peak interpolation result of Davidson and the second named author, we obtain strengthenings of boundary interpolation theorems of Peller and Khrushch\"{e}v and of Cohn and Verbitsky.Comment: 20 page
International audienceLet $\cD$ be the Dirichlet space, namely the space of holomorphic functions on...
AbstractThe well-known Sobolev embedding theorem is generalized in terms of geometric measure theory...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
In the context of Dirichlet type spaces on the unit ball of ℂ, also known as Hardy–Sobolev or Besov...
International audienceWe study the zeros sets of functions in the Dirichlet space. Using Carleson fo...
International audienceWe study the zeros sets of functions in the Dirichlet space. Using Carleson fo...
Given a subset $E$ of $\R^n$ with empty interior and an integrability parameter $1<p<\infty$, what i...
This paper concerns the following question: given a subset $E$ of $\mathbb{R}^n$ with empty interior...
AbstractFor a Kähler manifold X, we study a space of test functions W∗ which is a complex version of...
This thesis deals with interpolation problems in spaces of analytic functions of Dirichlet type, tha...
AbstractIt is shown that an analytic map ϕ of the unit disk into itself inducing a Hilbert–Schmidt c...
The Dirichlet space is one of the three fundamental Hilbert spaces of holomorphic functions on the u...
We discuss the potential theory related to variational capacity and the Sobolev capacity on metric m...
AbstractWe show that the asymptotic behavior of the partial sums of a sequence of positive numbers d...
It is well-known that the Hausdorff capacity and its dyadic version play an important role in potent...
International audienceLet $\cD$ be the Dirichlet space, namely the space of holomorphic functions on...
AbstractThe well-known Sobolev embedding theorem is generalized in terms of geometric measure theory...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
In the context of Dirichlet type spaces on the unit ball of ℂ, also known as Hardy–Sobolev or Besov...
International audienceWe study the zeros sets of functions in the Dirichlet space. Using Carleson fo...
International audienceWe study the zeros sets of functions in the Dirichlet space. Using Carleson fo...
Given a subset $E$ of $\R^n$ with empty interior and an integrability parameter $1<p<\infty$, what i...
This paper concerns the following question: given a subset $E$ of $\mathbb{R}^n$ with empty interior...
AbstractFor a Kähler manifold X, we study a space of test functions W∗ which is a complex version of...
This thesis deals with interpolation problems in spaces of analytic functions of Dirichlet type, tha...
AbstractIt is shown that an analytic map ϕ of the unit disk into itself inducing a Hilbert–Schmidt c...
The Dirichlet space is one of the three fundamental Hilbert spaces of holomorphic functions on the u...
We discuss the potential theory related to variational capacity and the Sobolev capacity on metric m...
AbstractWe show that the asymptotic behavior of the partial sums of a sequence of positive numbers d...
It is well-known that the Hausdorff capacity and its dyadic version play an important role in potent...
International audienceLet $\cD$ be the Dirichlet space, namely the space of holomorphic functions on...
AbstractThe well-known Sobolev embedding theorem is generalized in terms of geometric measure theory...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...