Weyl-Titchmarsh theory for Sturm-Liouville operators with distributional potentials
| creativeworkseries.issn | 1232-9274 | |
| dc.contributor.author | Eckhardt, Jonathan | |
| dc.contributor.author | Gesztesy, Fritz | |
| dc.contributor.author | Nichols, Roger | |
| dc.contributor.author | Teschl, Gerald | |
| dc.date.available | 2017-10-04T13:17:56Z | |
| dc.date.issued | 2013 | |
| dc.description.abstract | We systematically develop Weyl-Titchmarsh theory for singular differential operators on arbitrary intervals $(a,b) \subseteq \mathbb{R}$ associated with rather general differential expressions of the type $\begin{equation*}\tau f = \frac{1}{\tau} (-(p[f'+sf])'+sp[f'+sf]+qf),\end{equation*}$ where the coefficients $p,q,r,s$ are real-valued and Lebesgue measurable on $(a,b)$, with $p \neq 0$, $r \gt 0% a.e. on $(a,b)$, and $p^{-1}, q, r, s \in L_{loc}^1((a,b),dx)$, and $f$ is supposed to satisfy $\begin{equation*} f \in AC_{loc}((a,b)), p[f'+sf] \in AC_{loc}((a,b)). \end{equation*}$ In particular, this setup implies that $\tau$ permits a distributional potential coefficient, including potentials in $H_{loc}^{-1}((a,b))$. We study maximal and minimal Sturm-Liouville operators, all self-adjoint restrictions of the maximal operator $T_{max}$, or equivalently, all self-adjoint extensions of the minimal operator $T_{min}$, all self-adjoint boundary conditions (separated and coupled ones), and describe the resolvent of any self-adjoint extension of $T_{min}$. In addition, we characterize the principal object of this paper, the singular Weyl-Titchmarsh-Kodaira m-function corresponding to any self-adjoint extension with separated boundary conditions and derive the corresponding spectral transformation, including a characterization of spectral multiplicities and minimal supports of standard subsets of the spectrum. We also deal with principal solutions and characterize the Friedrichs extension of $T_{min}$. Finally, in the special case where $\tau$ is regular, we characterize the Krein-von Neumann extension of $T_{min}$ and also characterize all boundary conditions that lead to positivity preserving, equivalently, improving, resolvents (and hence semigroups). | en |
| dc.description.version | wersja wydawnicza | |
| dc.identifier.doi | https://doi.org/10.7494/OpMath.2013.33.3.467 | |
| dc.identifier.eissn | 2300-6919 | |
| dc.identifier.issn | 1232-9274 | |
| dc.identifier.nukat | dd2014312018 | |
| dc.identifier.uri | https://repo.agh.edu.pl/handle/AGH/50643 | |
| dc.language.iso | eng | |
| dc.relation.ispartof | Opuscula Mathematica | |
| dc.rights | Attribution 4.0 International | |
| dc.rights.access | otwarty dostęp | |
| dc.rights.uri | https://creativecommons.org/licenses/by/4.0/legalcode | |
| dc.subject | Sturm-Liouville operators | en |
| dc.subject | distributional coefficients | en |
| dc.subject | Weyl-Titchmarsh theory | en |
| dc.subject | Friedrichs and Krein extensions | en |
| dc.subject | positivity preserving and improving semigroups | en |
| dc.title | Weyl-Titchmarsh theory for Sturm-Liouville operators with distributional potentials | en |
| dc.title.related | Opuscula Mathematica | |
| dc.type | artykuł | |
| dspace.entity.type | Publication | |
| publicationissue.issueNumber | No. 3 | |
| publicationissue.pagination | pp. 467-563 | |
| publicationvolume.volumeNumber | Vol. 33 | |
| relation.isJournalIssueOfPublication | dea23791-b349-43a8-b50e-d537226f8fd5 | |
| relation.isJournalIssueOfPublication.latestForDiscovery | dea23791-b349-43a8-b50e-d537226f8fd5 | |
| relation.isJournalOfPublication | 304b3b9b-59b9-4830-9178-93a77e6afbc7 |
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