Nonhomogeneous Neumann problem for the Poisson equation in domains with an external cusp

In this work we analyze the existence and regularity of the solution of a nonhomogeneous Neumann problem for the Poisson equation in a plane domain Ω with an external cusp. In order to prove that there exists a unique solution in H 1 ( Ω ) using the Lax–Milgram theorem we need to apply a trace theor...

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Bibliographic Details
Published in:	Journal of mathematical analysis and applications Vol. 310; no. 2; pp. 397 - 411
Main Authors:	Acosta, Gabriel, Armentano, María G., Durán, Ricardo G., Lombardi, Ariel L.
Format:	Journal Article
Language:	English
Published:	San Diego, CA Elsevier Inc 15-10-2005 Elsevier
Subjects:	Cuspidal domains Exact sciences and technology Mathematical analysis Mathematics Neumann problem Partial differential equations Regularity Sciences and techniques of general use Traces Neumann problem Traces Regularity Cuspidal domains Trace Solution uniqueness Mathematical analysis Solution regularity Poisson equation Cuspidal domain Cusp
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Summary:	In this work we analyze the existence and regularity of the solution of a nonhomogeneous Neumann problem for the Poisson equation in a plane domain Ω with an external cusp. In order to prove that there exists a unique solution in H 1 ( Ω ) using the Lax–Milgram theorem we need to apply a trace theorem. Since Ω is not a Lipschitz domain, the standard trace theorem for H 1 ( Ω ) does not apply, in fact the restriction of H 1 ( Ω ) functions is not necessarily in L 2 ( ∂ Ω ) . So, we introduce a trace theorem by using weighted Sobolev norms in Ω. Under appropriate assumptions we prove that the solution of our problem is in H 2 ( Ω ) and we obtain an a priori estimate for the second derivatives of the solution.
ISSN:	0022-247X 1096-0813
DOI:	10.1016/j.jmaa.2005.01.065