The Dirichlet-to-Neumann map, the boundary Laplacian, and Hörmander's rediscovered manuscript

Creators: Girouard, Alexandre; Karpukhin, Mikhail; Levitin, Michael; Polterovich, Iosif

Abstract

How close is the Dirichlet-to-Neumann (DtN) map to the square root of the corresponding boundary Laplacian? This question has been actively investigated in recent years. Somewhat surprisingly, a lot of techniques involved can be traced back to a newly rediscovered manuscript of Hörmander from the 1950s. We present Hörmander's approach and its applications, with an emphasis on eigenvalue estimates and spectral asymptotics. In particular, we obtain results for the DtN maps on non-smooth boundaries in the Riemannian setting, the DtN operators for the Helmholtz equation and the DtN operators on differential forms.

Additional Information

© 2022 European Mathematical Society. Published by EMS Press. This work is licensed under a CC BY 4.0 license. Published online: 2022-03-24. The authors are grateful to Graham Cox, Asma Hassannezhad, Konstantin Pankrashkin, David Sher, and Alexander Strohmaier for helpful discussions. Alexandre Girouard and Iosif Polterovich would also like to thank Yakar Kannai for providing them with a copy of the original Hörmander's manuscript before it was published as [21]. The research of Alexandre Girouard and Iosif Polterovich is partially supported by NSERC, as well as by FRQNT team grant #283055. Mikhail Karpukhin is partially supported by NSF grant DMS-1363432.

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