A class of Sturm-Liouville difference equations: (non)oscillation constants and property BD

DOŠLÝ, Ondřej and Roman HILSCHER. A class of Sturm-Liouville difference equations: (non)oscillation constants and property BD. Comput Math. Appl. 2003, vol. 45, No 1, p. 961-981. ISSN 0898-1221.

Basic information

• Original name: A class of Sturm-Liouville difference equations: (non)oscillation constants and property BD
• Authors: DOŠLÝ, Ondřej (203 Czech Republic, guarantor) and Roman HILSCHER (203 Czech Republic).
• Edition: Comput Math. Appl. 2003, 0898-1221.

Other information

• Original language: English
• Type of outcome: Article in a journal
• Field of Study: 10101 Pure mathematics
• Country of publisher: United States of America
• Confidentiality degree: is not subject to a state or trade secret
• Impact factor: Impact factor: 0.498
• RIV identification code: RIV/00216224:14310/03:00008096
• Organization unit: Faculty of Science
• UT WoS: 000183453300009
• Keywords in English: Sturm-Liouville difference operator; (non)oscillation criteria; disconjugacy; generalized zero; factorization of disconjugate operators; property BD
• Tags: (non)oscillation criteria, disconjugacy, factorization of disconjugate operators, generalized zero, property BD, Sturm-Liouville difference operator

Abstract

Oscillatory and spectral properties of the higher-order Sturm-Liouville difference equations are investigated. Sufficient conditions for (non)oscillation of these equations are derived and the obtained results are used to study discreteness and boundedness below (the so-called property BD) of the spectrum of associated difference operators.

Links

• GA201/01/0079, research and development project: Name: Kvalitativní teorie řešení diferenčních rovnic

Investor: Czech Science Foundation, Qualitative theory of solutions of difference equations

• GA201/99/0295, research and development project: Name: Kvalitativní teorie diferenciálních rovnic

Investor: Czech Science Foundation, Qualitative theory of differential equations