On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities
These classical inequalities allow one to estimate the number of negative eigenvalues and the sums $S_γ=\sum |λ_i|^γ$ for a wide class of Schrödinger operators. We provide a detailed proof of these inequalities for operators on functions in metric spaces using the classical Lieb approach based on th...
| Main Authors: | , |
|---|---|
| Format: | Text |
| Language: | unknown |
| Published: |
arXiv
2008
|
| Subjects: | |
| Online Access: | https://dx.doi.org/10.48550/arxiv.0812.2968 https://arxiv.org/abs/0812.2968 |
| id |
ftdatacite:10.48550/arxiv.0812.2968 |
|---|---|
| record_format |
openpolar |
| spelling |
ftdatacite:10.48550/arxiv.0812.2968 2023-05-15T17:07:17+02:00 On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities Molchanov, S. Vainberg, B. 2008 https://dx.doi.org/10.48550/arxiv.0812.2968 https://arxiv.org/abs/0812.2968 unknown arXiv arXiv.org perpetual, non-exclusive license http://arxiv.org/licenses/nonexclusive-distrib/1.0/ Mathematical Physics math-ph FOS Physical sciences 35P15, 47A75, 47B99, 20P05, 60J70 article-journal Article ScholarlyArticle Text 2008 ftdatacite https://doi.org/10.48550/arxiv.0812.2968 2022-04-01T14:58:47Z These classical inequalities allow one to estimate the number of negative eigenvalues and the sums $S_γ=\sum |λ_i|^γ$ for a wide class of Schrödinger operators. We provide a detailed proof of these inequalities for operators on functions in metric spaces using the classical Lieb approach based on the Kac-Feynman formula. The main goal of the paper is a new set of examples which include perturbations of the Anderson operator, operators on free, nilpotent and solvable groups, operators on quantum graphs, Markov processes with independent increments. The study of the examples requires an exact estimate of the kernel of the corresponding parabolic semigroup on the diagonal. In some cases the kernel decays exponentially as $t\to \infty $. This allows us to consider very slow decaying potentials and obtain some results that are precise in the logarithmical scale. : 1) A small inaccuracy in Step 7 of the proof of Theorem 2.1 was corrected. 2) The paper has been published in Around the research of Vladimir Maz'ya III, Editor A. Laptev, Int. Math. Ser. (N.Y.) 13, Springer, 2010, 201-246 Text laptev DataCite Metadata Store (German National Library of Science and Technology) |
| institution |
Open Polar |
| collection |
DataCite Metadata Store (German National Library of Science and Technology) |
| op_collection_id |
ftdatacite |
| language |
unknown |
| topic |
Mathematical Physics math-ph FOS Physical sciences 35P15, 47A75, 47B99, 20P05, 60J70 |
| spellingShingle |
Mathematical Physics math-ph FOS Physical sciences 35P15, 47A75, 47B99, 20P05, 60J70 Molchanov, S. Vainberg, B. On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| topic_facet |
Mathematical Physics math-ph FOS Physical sciences 35P15, 47A75, 47B99, 20P05, 60J70 |
| description |
These classical inequalities allow one to estimate the number of negative eigenvalues and the sums $S_γ=\sum |λ_i|^γ$ for a wide class of Schrödinger operators. We provide a detailed proof of these inequalities for operators on functions in metric spaces using the classical Lieb approach based on the Kac-Feynman formula. The main goal of the paper is a new set of examples which include perturbations of the Anderson operator, operators on free, nilpotent and solvable groups, operators on quantum graphs, Markov processes with independent increments. The study of the examples requires an exact estimate of the kernel of the corresponding parabolic semigroup on the diagonal. In some cases the kernel decays exponentially as $t\to \infty $. This allows us to consider very slow decaying potentials and obtain some results that are precise in the logarithmical scale. : 1) A small inaccuracy in Step 7 of the proof of Theorem 2.1 was corrected. 2) The paper has been published in Around the research of Vladimir Maz'ya III, Editor A. Laptev, Int. Math. Ser. (N.Y.) 13, Springer, 2010, 201-246 |
| format |
Text |
| author |
Molchanov, S. Vainberg, B. |
| author_facet |
Molchanov, S. Vainberg, B. |
| author_sort |
Molchanov, S. |
| title |
On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| title_short |
On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| title_full |
On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| title_fullStr |
On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| title_full_unstemmed |
On general Cwikel-Lieb-Rozenblum and Lieb-Thirring inequalities |
| title_sort |
on general cwikel-lieb-rozenblum and lieb-thirring inequalities |
| publisher |
arXiv |
| publishDate |
2008 |
| url |
https://dx.doi.org/10.48550/arxiv.0812.2968 https://arxiv.org/abs/0812.2968 |
| genre |
laptev |
| genre_facet |
laptev |
| op_rights |
arXiv.org perpetual, non-exclusive license http://arxiv.org/licenses/nonexclusive-distrib/1.0/ |
| op_doi |
https://doi.org/10.48550/arxiv.0812.2968 |
| _version_ |
1766062663596507136 |