Overdetermined boundary problems with nonconstant Dirichlet and Neumann data
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Abstract
We consider the overdetermined boundary problem for a general second-order semilinear elliptic equation on bounded domains of
R
n
, where one prescribes both the Dirichlet and Neumann data of the solution. We are interested in the case where the data are not necessarily constant and where the coefficients of the equation can depend on the position, so that the overdetermined problem does not generally admit a radial solution. Our main result is that, nevertheless, under minor technical hypotheses nontrivial solutions to the overdetermined boundary problem always exist.
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Analysis & PDE 16 (2023), no. 9, 1989-2003
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https://doi.org/10.2140/apde.2023.16.1989Sponsors
Domínguez-Vázquez is supported by the grants PID2019-105138GB-C21 (AEI, Spain) and ED431C 2019/10, ED431F 2020/04 (Xunta de Galicia, Spain), and by the Ramón y Cajal program of the Spanish Ministry of Science. This work has received funding from the European Research Council (ERC) under the European Union’s Horizon 2020 research and innovation programme through the Consolidator Grant agreement 862342 (Enciso). It is also supported by the grants CEX2019-000904-S, RED2022-134301-T, and PID2022-136795NB-I00 (Enciso and Peralta-Salas) funded by MCIN/ AEI.