The Strong nonlinear limit-point/limit-circle problem

BARTUŠEK, Miroslav and John R. GRAEF. The Strong nonlinear limit-point/limit-circle problem. první. Singapure: World Scientific Publishing Company, 2017, 324 pp. Trends in Abstract and Applied Analysis , Vol. 6. ISBN 978-981-322-637-1. Available from: https://dx.doi.org/10.1142/10608.

Basic information

• Original name: The Strong nonlinear limit-point/limit-circle problem
• Name in Czech: Silný nelineární limit-point/limit-circle problém
• Authors: BARTUŠEK, Miroslav (203 Czech Republic, guarantor, belonging to the institution) and John R. GRAEF (840 United States of America).
• Edition: první. Singapure, 324 pp. Trends in Abstract and Applied Analysis , Vol. 6, 2017.
• Publisher: World Scientific Publishing Company

Other information

• Original language: English
• Type of outcome: Book on a specialized topic
• Field of Study: 10101 Pure mathematics
• Country of publisher: Singapore
• Confidentiality degree: is not subject to a state or trade secret
• Publication form: printed version "print"
• WWW: URL
• RIV identification code: RIV/00216224:14310/17:00098142
• Organization unit: Faculty of Science
• ISBN: 978-981-322-637-1
• Doi: http://dx.doi.org/10.1142/10608
• UT WoS: 000424971700011
• Keywords (in Czech): silný limit-point/limit-circle problém;rovnice druhého řádu s p-Laplaciánem;rovnice se zpožděním;rovnice vysších řádů
• Keywords in English: strong limit-point; strong limit-circle; second order differential equations with p-Laplacian; delyed equations; higher order equations
• Tags: half-linear equations, NZ, p-Laplacian, rivok, strong limit-point type, strong nonlinear limit-circle
• Tags: International impact, Reviewed

Abstract

The problem of limit-point/limit-circle equations is studied for different types of them: second order differential equations with p-Laplacian without or with delay,damped equations,even order differential equations.

Abstract (in Czech)

Je studována problematika limit-poit/limit-circle rovnic pro různé jejich typy: diferenciální rovnice druhého řádu s p-Laplaciánem s nebo bez zpoždění, rovnice se středním členem, rovnice sudého řádu.