Rolando Magnanini, Giorgio Poggesi
Published 2017-08-24Version 1
We consider Serrin's overdetermined problem for the torsional rigidity and Alexandrov's Soap Bubble Theorem. We present new integral identities, that show a strong analogy between the two problems and help to obtain better (in some cases optimal) quantitative estimates for the radially symmetric configuration. The estimates for the Soap Bubble Theorem benefit from those of Serrin's problem.
Alexandrov, Serrin, Weinberger, Reilly: simmetry and stability by integral identities
Nontrivial solutions to Serrin's problem in annular domains
Bubbling and quantitative stability for Alexandrov's Soap Bubble Theorem with $L^1$-type deviations
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