Add to ORKGWe first survey some recent results on optimal embeddings for the space of functions whose \Delta u\in L^1(\Omega), where \Omega\subsetR^2 is a bounded domain. The target space in the embeddings turns out to be a Zygmund space and the best constants are explicitly known. Remarkably, the best constant in the case of zero boundary data is twice the best constant in the case of compactly supported functions. Then, following the same strategy, we establish a new version of the celebrated Trudinger--Moser inequality, in the Zygmund space Z_0^{1/2}(\Omega), and we prove that, in contrast to the Moser case, here the best embedding constant is not attained
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We first investigate concentration and vanishing phenomena concerning Moser type inequalities in the...
We prove optimal embeddings of Calderon spaces built-up over function spaces defined in R-n with the...
We study optimal embeddings for the space of functions whose Laplacian \Delta u belongs to L^1(\Omeg...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We first investigate concentration and vanishing phenomena concerning Moser type inequalities in the...
We prove optimal embeddings of Calderon spaces built-up over function spaces defined in R-n with the...
We study optimal embeddings for the space of functions whose Laplacian \Delta u belongs to L^1(\Omeg...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
We survey old and new results about the so-called limiting Sobolev case for the embedding of the spa...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
summary:Let $n\geq 2$ and $\Omega\subset \mathbb R^n$ be a bounded set. We give a Moser-type inequal...
We study the so-called limiting Sobolev cases for embeddings of the spaces $W^{1,n}_0(\Omega)$, wher...
We first investigate concentration and vanishing phenomena concerning Moser type inequalities in the...
We prove optimal embeddings of Calderon spaces built-up over function spaces defined in R-n with the...