Payne-Philippin's overdetermined problems on compact surfaces
Abstract
We investigate the overdetermined problem given by equation* u=0 in , ∂ u∂ =σ1 u on ∂ , |∇ u|=constant on ∂ , equation* where is a connected compact Riemannian surface with smooth boundary ∂ , and σ1 is the first nonzero Steklov eigenvalue of . We prove that this overdetermined problem admits a nontrivial solution if and only if is σ-homothetic to either the flat unit disk or a flat cylinder [-T,T]× S1 for some T T1. This gives a complete answer to the question raised by Payne and Philippin in [Z. Angew. Math. Phys. 42(6), 864-873, 1991] for σ=σ1 and arbitrary surfaces. In particular, we completely characterize compact domains in 2-dimensional space forms for which the overdetermined problem is solvable.
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