Data di Pubblicazione:
2010
Citazione:
Best constants in a borderline case of second order Moser type inequalities / D. Cassani, B. Ruf, C. Tarsi. - In: ANNALES DE L INSTITUT HENRI POINCARÉ. ANALYSE NON LINÉAIRE. - ISSN 0294-1449. - 27:1(2010 Jan), pp. 73-93. [10.1016/j.anihpc.2009.07.006]
Abstract:
We study optimal embeddings for the space of functions whose
Laplacian \Delta u belongs to L^1(\Omega), where \Omega\subset\R^N
is a bounded domain. This function space turns out to be strictly
larger than the Sobolev space W^{2,1}(\Omega) in which the whole
set of second order derivatives is considered. In particular, in
the limiting Sobolev case, when N=2, we establish a sharp
embedding inequality into the Zygmund space L_{exp}(\Omega). On one
hand, this result enables us to improve the Brezis--Merle
\cite{BM} regularity estimate for the Dirichlet problem \Delta
u=f(x)\in L^1(\Omega), u=0 on \partial\Omega; on the other hand, it
represents a borderline case of D.R. Adams'' \cite{DRA}
generalization of Trudinger-Moser type inequalities to the case of
higher order derivatives. Extensions to dimension N\geq are
also given. Besides, we show how the best constants in the
embedding inequalities change under different boundary conditions
Tipologia IRIS:
01 - Articolo su periodico
Keywords:
Best constants; Brezis-Merle type results; Elliptic equations; Pohožaev, Strichartz and Trudinger-Moser inequalities; Regularity estimates in L1; Sobolev embeddings
Elenco autori:
D. Cassani, B. Ruf, C. Tarsi
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