Download
Download![[thumbnail of GKLPv4.pdf]](https://reading-clone.eprints-hosting.org/style/images/fileicons/text.png "GKLPv4.pdf")
Girouard, A., Karpukhin, M., Levitin, M. 
ORCID: https://orcid.org/0000-0003-0020-3265 and Polterovich, I.
(2022)
The Dirichlet-to-Neumann map, the boundary Laplacian, and Hörmander’s rediscovered manuscript.
Journal of Spectral Theory, 12 (1).
pp. 195-225.
ISSN 1664-0403
doi: 10.4171/JST/399
Abstract/Summary
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.
Altmetric Badge
| Item Type | Article |
| URI | https://reading-clone.eprints-hosting.org/id/eprint/100049 |
| Identification Number/DOI | 10.4171/JST/399 |
| Refereed | Yes |
| Divisions | Science > School of Mathematical, Physical and Computational Sciences > Department of Mathematics and Statistics |
| Uncontrolled Keywords | Dirichlet-to-Neumann map, Laplace–Beltrami operator, Dirichlet eigenvalues, Robin eigenvalues, eigenvalue asymptotics |
| Publisher | European Mathematical Society |
| Download/View statistics | View download statistics for this item |
Downloads
Downloads per month over past year
University Staff: Request a correction | Centaur Editors: Update this record
