%0 Journal Article %1 geisinger2011sharp %A Geisinger, Leander %A Weidl, Timo %D 2011 %J Reviews in Mathematical Physics. %K geisinger iadm from:elkepeter spectral estimates weidl %N 6 %P 615-641 %R 10.1142/S0129055X11004394 %T Sharp spectral estimates in domains of infinite volume. %V 23 %X We consider the Dirichlet Laplace operator on open, quasi-bounded domains of infinite volume. For such domains semiclassical spectral estimates based on the phase-space volume - and therefore on the volume of the domain - must fail. Here we present a method how one can nevertheless prove uniform bounds on eigenvalues and eigenvalue means which are sharp in the semiclassical limit. We give examples in horn-shaped regions and so-called spiny urchins. Some results are extended to Schrödinger operators defined on quasi-bounded domains with Dirichlet boundary conditions.

@article{geisinger2011sharp, abstract = {We consider the Dirichlet Laplace operator on open, quasi-bounded domains of infinite volume. For such domains semiclassical spectral estimates based on the phase-space volume - and therefore on the volume of the domain - must fail. Here we present a method how one can nevertheless prove uniform bounds on eigenvalues and eigenvalue means which are sharp in the semiclassical limit. We give examples in horn-shaped regions and so-called spiny urchins. Some results are extended to Schrödinger operators defined on quasi-bounded domains with Dirichlet boundary conditions.}, added-at = {2021-11-04T06:41:26.000+0100}, author = {Geisinger, Leander and Weidl, Timo}, biburl = {https://puma.ub.uni-stuttgart.de/bibtex/281a22819f19677675334cfa64c8ed4e7/mathematik}, doi = {10.1142/S0129055X11004394}, interhash = {30aa9eb360b3dc8e2f38dd542b86ea97}, intrahash = {81a22819f19677675334cfa64c8ed4e7}, journal = {Reviews in Mathematical Physics.}, keywords = {geisinger iadm from:elkepeter spectral estimates weidl}, language = {English}, number = 6, pages = {615-641}, timestamp = {2023-04-21T13:37:46.000+0200}, title = {Sharp spectral estimates in domains of infinite volume.}, volume = 23, year = 2011 }