Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization
This thesis consists of eight papers primarily concerned with the quantitative study of the spectrum of certain differential operators. The majority of the results split into two categories. On the one hand Papers B-E concern questions of a spectral-geometric nature, namely, the relation of the geom...
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| Format: | Doctoral or Postdoctoral Thesis |
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KTH, Matematik (Avd.)
2019
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ftkthstockholm:oai:DiVA.org:kth-249837 2023-05-15T17:07:18+02:00 Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization Larson, Simon 2019 application/pdf http://urn.kb.se/resolve?urn=urn:nbn:se:kth:diva-249837 eng eng KTH, Matematik (Avd.) Stockholm, Sweden TRITA-SCI-FOU 2019:24 orcid:0000-0002-0057-8211 http://urn.kb.se/resolve?urn=urn:nbn:se:kth:diva-249837 urn:isbn:978-91-7873-199-2 info:eu-repo/semantics/openAccess Spectral theory shape optimization semiclassical asymptotics spectral inequalities quantum mechanics Mathematical Analysis Matematisk analys Doctoral thesis, comprehensive summary info:eu-repo/semantics/doctoralThesis text 2019 ftkthstockholm 2022-08-11T12:38:45Z This thesis consists of eight papers primarily concerned with the quantitative study of the spectrum of certain differential operators. The majority of the results split into two categories. On the one hand Papers B-E concern questions of a spectral-geometric nature, namely, the relation of the geometry of a region in d-dimensional Euclidean space to the spectrum of the associated Dirichlet Laplace operator. On the other hand Papers G and H concern kinetic energy inequalities arising in many-particle systems in quantum mechanics. Paper A falls outside the realm of spectral theory. Instead the paper is devoted to a question in convex geometry. More precisely, the main result of the paper concerns a lower bound for the perimeter of inner parallel bodies of a convex set. However, as is demonstrated in Paper B the result of Paper A can be very useful when studying the Dirichlet Laplacian in a convex domain. In Paper B we revisit an argument of Geisinger, Laptev, and Weidl for proving improved Berezin-Li-Yau inequalities. In this setting the results of Paper A allow us to prove a two-term Berezin-Li-Yau inequality for the Dirichlet Laplace operator in convex domains. Importantly, the inequality exhibits the correct geometric behaviour in the semiclassical limit. Papers C and D concern shape optimization problems for the eigenvalues of Laplace operators. The aim of both papers is to understand the asymptotic shape of domains which in a semiclassical limit optimize eigenvalues, or eigenvalue means, of the Dirichlet or Neumann Laplace operator among classes of domains with fixed measure. Paper F concerns a related problem but where the optimization takes place among a one-parameter family of Schrödinger operators instead of among Laplace operators in different domains. The main ingredients in the analysis of the semiclassical shape optimization problems in Papers C, D, and F are combinations of asymptotic and universal spectral estimates. For the shape optimization problem studied in Paper C, such estimates are provided ... Doctoral or Postdoctoral Thesis laptev Royal Institute of Technology, Stockholm: KTHs Publication Database DiVA Laplace ENVELOPE(141.467,141.467,-66.782,-66.782) |
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Open Polar |
| collection |
Royal Institute of Technology, Stockholm: KTHs Publication Database DiVA |
| op_collection_id |
ftkthstockholm |
| language |
English |
| topic |
Spectral theory shape optimization semiclassical asymptotics spectral inequalities quantum mechanics Mathematical Analysis Matematisk analys |
| spellingShingle |
Spectral theory shape optimization semiclassical asymptotics spectral inequalities quantum mechanics Mathematical Analysis Matematisk analys Larson, Simon Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| topic_facet |
Spectral theory shape optimization semiclassical asymptotics spectral inequalities quantum mechanics Mathematical Analysis Matematisk analys |
| description |
This thesis consists of eight papers primarily concerned with the quantitative study of the spectrum of certain differential operators. The majority of the results split into two categories. On the one hand Papers B-E concern questions of a spectral-geometric nature, namely, the relation of the geometry of a region in d-dimensional Euclidean space to the spectrum of the associated Dirichlet Laplace operator. On the other hand Papers G and H concern kinetic energy inequalities arising in many-particle systems in quantum mechanics. Paper A falls outside the realm of spectral theory. Instead the paper is devoted to a question in convex geometry. More precisely, the main result of the paper concerns a lower bound for the perimeter of inner parallel bodies of a convex set. However, as is demonstrated in Paper B the result of Paper A can be very useful when studying the Dirichlet Laplacian in a convex domain. In Paper B we revisit an argument of Geisinger, Laptev, and Weidl for proving improved Berezin-Li-Yau inequalities. In this setting the results of Paper A allow us to prove a two-term Berezin-Li-Yau inequality for the Dirichlet Laplace operator in convex domains. Importantly, the inequality exhibits the correct geometric behaviour in the semiclassical limit. Papers C and D concern shape optimization problems for the eigenvalues of Laplace operators. The aim of both papers is to understand the asymptotic shape of domains which in a semiclassical limit optimize eigenvalues, or eigenvalue means, of the Dirichlet or Neumann Laplace operator among classes of domains with fixed measure. Paper F concerns a related problem but where the optimization takes place among a one-parameter family of Schrödinger operators instead of among Laplace operators in different domains. The main ingredients in the analysis of the semiclassical shape optimization problems in Papers C, D, and F are combinations of asymptotic and universal spectral estimates. For the shape optimization problem studied in Paper C, such estimates are provided ... |
| format |
Doctoral or Postdoctoral Thesis |
| author |
Larson, Simon |
| author_facet |
Larson, Simon |
| author_sort |
Larson, Simon |
| title |
Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| title_short |
Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| title_full |
Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| title_fullStr |
Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| title_full_unstemmed |
Asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| title_sort |
asymptotic and universal spectral estimates with applications in many-body quantum mechanics and spectral shape optimization |
| publisher |
KTH, Matematik (Avd.) |
| publishDate |
2019 |
| url |
http://urn.kb.se/resolve?urn=urn:nbn:se:kth:diva-249837 |
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ENVELOPE(141.467,141.467,-66.782,-66.782) |
| geographic |
Laplace |
| geographic_facet |
Laplace |
| genre |
laptev |
| genre_facet |
laptev |
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TRITA-SCI-FOU 2019:24 orcid:0000-0002-0057-8211 http://urn.kb.se/resolve?urn=urn:nbn:se:kth:diva-249837 urn:isbn:978-91-7873-199-2 |
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info:eu-repo/semantics/openAccess |
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1766062677889646592 |