Towards Nonlinearity: The p-Regularity Theory

We present recent advances in the analysis of nonlinear problems involving singular (degenerate) operators. The results are obtained within the framework of p-regularity theory, which has been successfully developed over the past four decades. We illustrate the theory with applications to degenerate...

Ausführliche Beschreibung

Gespeichert in:

Bibliographische Detailangaben
Veröffentlicht in:	Entropy (Basel, Switzerland) Jg. 27; H. 5; S. 518
Hauptverfasser:	Bednarczuk, Ewa, Brezhneva, Olga, Leśniewski, Krzysztof, Prusińska, Agnieszka, Tret’yakov, Alexey A.
Format:	Journal Article
Sprache:	Englisch
Veröffentlicht:	Switzerland MDPI AG 12.05.2025 MDPI
Schlagworte:	Analysis Banach spaces Boundary value problems Computational mathematics degenerate problems Differential equations Dynamical systems implicit function theorem Mathematical analysis nonlinear differential equations Nonlinear equations nonlinear optimization Nonlinearity Numerical analysis Numerical methods operator equations Operators (mathematics) Optimization Parameters Partial differential equations Regularity New York United States Germany Russia numerical methods p-regularity singularities degenerate problems operator equations nonlinear differential equations implicit function theorem nonlinear optimization
ISSN:	1099-4300, 1099-4300
Online-Zugang:	Volltext
Tags:	Tag hinzufügen Keine Tags, Fügen Sie den ersten Tag hinzu!

Beschreibung
Zusammenfassung:	We present recent advances in the analysis of nonlinear problems involving singular (degenerate) operators. The results are obtained within the framework of p-regularity theory, which has been successfully developed over the past four decades. We illustrate the theory with applications to degenerate problems in various areas of mathematics, including optimization and differential equations. In particular, we address the problem of describing the tangent cone to the solution set of nonlinear equations in singular cases. The structure of p-factor operators is used to propose optimality conditions and to construct novel numerical methods for solving degenerate nonlinear equations and optimization problems. The numerical methods presented in this paper represent the first approaches targeting solutions to degenerate problems such as the Van der Pol differential equation, boundary-value problems with small parameters, and partial differential equations where Poincaré’s method of small parameters fails. Additionally, these methods may be extended to nonlinear degenerate dynamical systems and other related problems.
Bibliographie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14 content type line 23
ISSN:	1099-4300 1099-4300
DOI:	10.3390/e27050518