Spectral asymptotics for nonsmooth singular Green operators

Institut for Matematiske Fag

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Spectral asymptotics for nonsmooth singular Green operators. / Grubb, Gerd.

I: Communications in Partial Differential Equations, Bind 39, Nr. 3, 2014, s. 530-573.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt

Harvard

Grubb, G 2014, 'Spectral asymptotics for nonsmooth singular Green operators', Communications in Partial Differential Equations, bind 39, nr. 3, s. 530-573. https://doi.org/10.1080/03605302.2013.864207

APA

Grubb, G. (2014). Spectral asymptotics for nonsmooth singular Green operators. Communications in Partial Differential Equations, 39(3), 530-573. https://doi.org/10.1080/03605302.2013.864207

Vancouver

Grubb G. Spectral asymptotics for nonsmooth singular Green operators. Communications in Partial Differential Equations. 2014;39(3):530-573. https://doi.org/10.1080/03605302.2013.864207

Author

Grubb, Gerd. / Spectral asymptotics for nonsmooth singular Green operators. I: Communications in Partial Differential Equations. 2014 ; Bind 39, Nr. 3. s. 530-573.

Bibtex

@article{b474a46de50641d9a56ddb275e1ca68b,

title = "Spectral asymptotics for nonsmooth singular Green operators",

abstract = "Singular Green operators G appear typically as boundary correction terms in resolvents for elliptic boundary value problems on a domain Ω ⊂ ℝ n , and more generally they appear in the calculus of pseudodifferential boundary problems. In particular, the boundary term in a Krein resolvent formula is a singular Green operator. It is well-known in smooth cases that when G is of negative order −t on a bounded domain, its eigenvalues ors-numbers have the behavior (*)s j (G) ∼ cj −t/(n−1) for j → ∞, governed by the boundary dimension n − 1. In some nonsmooth cases, upper estimates (**)s j (G) ≤ Cj −t/(n−1) are known.We show that (*) holds when G is a general selfadjoint nonnegative singular Green operator with symbol merely H{\"o}lder continuous in x. We also show (*) with t = 2 for the boundary term in the Krein resolvent formula comparing the Dirichlet and a Neumann-type problem for a strongly elliptic second-order differential operator (not necessarily selfadjoint) with coefficients in for some q > n.",

keywords = "Faculty of Science, Matematik, partielle differentialligninger",

author = "Gerd Grubb",

year = "2014",

doi = "10.1080/03605302.2013.864207",

language = "English",

volume = "39",

pages = "530--573",

journal = "Communications in Partial Differential Equations",

issn = "0360-5302",

publisher = "Taylor & Francis",

number = "3",

}

RIS

TY - JOUR

T1 - Spectral asymptotics for nonsmooth singular Green operators

AU - Grubb, Gerd

PY - 2014

Y1 - 2014

N2 - Singular Green operators G appear typically as boundary correction terms in resolvents for elliptic boundary value problems on a domain Ω ⊂ ℝ n , and more generally they appear in the calculus of pseudodifferential boundary problems. In particular, the boundary term in a Krein resolvent formula is a singular Green operator. It is well-known in smooth cases that when G is of negative order −t on a bounded domain, its eigenvalues ors-numbers have the behavior (*)s j (G) ∼ cj −t/(n−1) for j → ∞, governed by the boundary dimension n − 1. In some nonsmooth cases, upper estimates (**)s j (G) ≤ Cj −t/(n−1) are known.We show that (*) holds when G is a general selfadjoint nonnegative singular Green operator with symbol merely Hölder continuous in x. We also show (*) with t = 2 for the boundary term in the Krein resolvent formula comparing the Dirichlet and a Neumann-type problem for a strongly elliptic second-order differential operator (not necessarily selfadjoint) with coefficients in for some q > n.

AB - Singular Green operators G appear typically as boundary correction terms in resolvents for elliptic boundary value problems on a domain Ω ⊂ ℝ n , and more generally they appear in the calculus of pseudodifferential boundary problems. In particular, the boundary term in a Krein resolvent formula is a singular Green operator. It is well-known in smooth cases that when G is of negative order −t on a bounded domain, its eigenvalues ors-numbers have the behavior (*)s j (G) ∼ cj −t/(n−1) for j → ∞, governed by the boundary dimension n − 1. In some nonsmooth cases, upper estimates (**)s j (G) ≤ Cj −t/(n−1) are known.We show that (*) holds when G is a general selfadjoint nonnegative singular Green operator with symbol merely Hölder continuous in x. We also show (*) with t = 2 for the boundary term in the Krein resolvent formula comparing the Dirichlet and a Neumann-type problem for a strongly elliptic second-order differential operator (not necessarily selfadjoint) with coefficients in for some q > n.

KW - Faculty of Science

KW - Matematik

KW - partielle differentialligninger

U2 - 10.1080/03605302.2013.864207

DO - 10.1080/03605302.2013.864207

M3 - Journal article

VL - 39

SP - 530

EP - 573

JO - Communications in Partial Differential Equations

JF - Communications in Partial Differential Equations

SN - 0360-5302

IS - 3

ER -

ID: 102113374