Two-Term Spectral Asymptotics for the Dirichlet Laplacian on a Bounded Domain

Frank, Rupert L.; Geisinger, Leander

doi:10.1142/9789814350365_0012

Cited by 26 publications

(74 citation statements)

References 10 publications

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“…Hence, this result is independent of the boundary coefficient b and the proof of Proposition 2.2 is the same as in [4].…”

Section: Proposition 21mentioning

confidence: 57%

“…We obtain these results by further extending the approach developed in [4,5], where we treated the Dirichlet Laplacian and the fractional Laplacian on a domain. One virtue of this approach is that it requires only rather weak regularity assumptions on ∂ and b.…”

Section: ∂ (H (X)−6c(x)) Dσ (X)t + O(tmentioning

confidence: 81%

“…In order to prove (6.5) we introduce local coordinates similarly as in Sect. 4. In this way we are reduced to the situation whereÑ is a subset of R d−1 satisfying a uniform interior ball condition (with a possibly smaller radius).…”

Section: Then For Any Relatively Open N ⊂ ∂ the Setmentioning

confidence: 99%

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Semi-classical analysis of the Laplace operator with Robin boundary conditions

Frank

Geisinger

2012

Bull. Math. Sci.

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We prove a two-term asymptotic expansion of eigenvalue sums of the Laplacian on a bounded domain with Neumann, or more generally, Robin boundary conditions. We formulate and prove the asymptotics in terms of semi-classical analysis. In this reformulation it is natural to allow the function describing the boundary conditions to depend on the semi-classical parameter and we identify and analyze three different regimes for this dependence.

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“…Hence, this result is independent of the boundary coefficient b and the proof of Proposition 2.2 is the same as in [4].…”

Section: Proposition 21mentioning

confidence: 57%

Section: ∂ (H (X)−6c(x)) Dσ (X)t + O(tmentioning

confidence: 81%

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Semi-classical analysis of the Laplace operator with Robin boundary conditions

Frank

Geisinger

2012

Bull. Math. Sci.

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“…Recently, (2.8) was extended to all domains with C 1,α boundary (with α > 0) by Frank and Geisinger [6].…”

Section: Remark 25mentioning

confidence: 99%

Improved Berezin—Li—Yau inequalities with magnetic field

Kovařík¹,

Weidl²

2015

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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“…These results are in parallel with the results of van den Berg [7] and Brown [9] for the Laplacian. For further recent work on the Dirichlet case in domains of Euclidean space, see Frank and Geisinger [22,23]. For other results related to the spectral theory of these operators, see [2,3] and references therein.…”

Section: Introductionmentioning

confidence: 99%