Schnieders, Inka 
ORCID: 0000-0002-4895-0000 and Sweers, Guido ORCID: 0000-0003-0180-5890
(2020).
A biharmonic converse to Krein-Rutman: a maximum principle near a positive eigenfunction.
Positivity, 24 (3).
S. 677 - 711.
DORDRECHT:
SPRINGER.
ISSN 1572-9281
Abstract
The Green function G(0)(x,y) for the biharmonic Dirichlet problem on a smooth domain Omega, that is Delta(2)u=f in Omega with u=u(n)=0 on partial derivative Omega, can be written as the difference of a positive function, which bears the singularity at x=y, and a rank-one positive function, both of which satisfy the boundary conditions. See Grunau et al. (Proc Am Math Soc 139:2151-2161, 2011). More precisely G(0)(x,y)=H(x,y)-cd(x)(2)d(y)(2) holds, where d(.) is the distance to the boundary partial derivative Omega and where H contains the singularity and is positive. We will extend the corresponding estimates to G lambda(x,y) for the differential operator Delta(2)-lambda with an optimal dependence on lambda. As a consequence, strict positivity of an eigenfunction with a simple eigenvalue lambda(i) implies a positivity preserving property for (Delta(2)-lambda)u=f in Omega with u=u(n)=0 on partial derivative Omega for lambda in a left neighbourhood of lambda i. This result can be viewed as a converse to the Krein-Rutman theorem.
| Item Type: | Journal Article | ||||||||||||
| Creators: |
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| URN: | urn:nbn:de:hbz:38-328542 | ||||||||||||
| DOI: | 10.1007/s11117-019-00702-3 | ||||||||||||
| Journal or Publication Title: | Positivity | ||||||||||||
| Volume: | 24 | ||||||||||||
| Number: | 3 | ||||||||||||
| Page Range: | S. 677 - 711 | ||||||||||||
| Date: | 2020 | ||||||||||||
| Publisher: | SPRINGER | ||||||||||||
| Place of Publication: | DORDRECHT | ||||||||||||
| ISSN: | 1572-9281 | ||||||||||||
| Language: | English | ||||||||||||
| Faculty: | Faculty of Mathematics and Natural Sciences | ||||||||||||
| Divisions: | Faculty of Mathematics and Natural Sciences > Department of Mathematics and Computer Science > Mathematical Institute | ||||||||||||
| Subjects: | no entry | ||||||||||||
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| Refereed: | Yes | ||||||||||||
| URI: | http://kups.ub.uni-koeln.de/id/eprint/32854 |
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