The Pompeiu problem
Year of origin: 1929
Posted online: 2018-05-22 12:29:33Z by Henrik Shahgholian891
Cite as: G-180522.1
Problem's Description
The Pompeiu problem states that if the integral of a nonzero continuous function on $\mathbb R^n$ vanishes on all congruent copies of a bounded Lipschitz domain $K$ then the domain is a ball. The problem can be reformulated in terms of PDEs: Suppose $v$ solves $$ \Delta v + \lambda v = \chi_{D}, \ \hbox{in }\mathbb R^n, \qquad v=0 \ \hbox{outside } D, $$ for some domain bounded domain $D$. Here $n\geq 2$. Is $D$ a ball?
The problem is connected to Schiffer's conjecture, and generally to free boundary problems.
See the video: https://www.youtube.com/watch?v=7nZgCBRZLds for some modified version of the conjecture and a finite element approach.
No solutions added yet
Edited: (general update ) at 2022-02-19 09:46:55Z
Edited: (authors edited ) at 2018-07-09 07:27:44Z View this version
Edited: (references edited ) at 2018-07-07 16:57:46Z View this version
Edited: (general update ) at 2018-06-30 10:55:47Z View this version
Edited: (general update ) at 2018-06-30 10:52:52Z View this version
Created at: 2018-05-22 12:29:33Z View this version
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