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Autores principales: Agudelo, Oscar, Holubová, Gabriela, Kudláč, Martin
Formato: Preprint
Publicado: 2024
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Acceso en línea:https://arxiv.org/abs/2408.10630
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author Agudelo, Oscar
Holubová, Gabriela
Kudláč, Martin
author_facet Agudelo, Oscar
Holubová, Gabriela
Kudláč, Martin
contents In this work we discuss a Hamiltonian system of ordinary differential equations under Dirichlet boundary conditions. The system of equations in consideration features a mixed (concave-convex) power nonlinearity depending on a positive parameter $λ$. We show multiplicity of nonnegative solutions of the system for a certain range of the parameter $λ$ and we also discuss regularity and symmetry of nonnegative solutions of the system. Besides, we present a numerical strategy aiming at the exploration of the optimal range of $λ$ for which multiplicity of solutions holds. The numerical experiments are based on the Poincaré-Miranda theorem and the shooting method, which have been lesser explored for systems of ODEs. Our work is motivated by the works of Ambrosetti et al., 1994 and Moreira dos Santos, 2009.
format Preprint
id arxiv_https___arxiv_org_abs_2408_10630
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Variational and numerical aspects of a system of ODEs with concave-convex nonlinerities
Agudelo, Oscar
Holubová, Gabriela
Kudláč, Martin
Functional Analysis
34A34, 34B08, 34B18, 35J35
In this work we discuss a Hamiltonian system of ordinary differential equations under Dirichlet boundary conditions. The system of equations in consideration features a mixed (concave-convex) power nonlinearity depending on a positive parameter $λ$. We show multiplicity of nonnegative solutions of the system for a certain range of the parameter $λ$ and we also discuss regularity and symmetry of nonnegative solutions of the system. Besides, we present a numerical strategy aiming at the exploration of the optimal range of $λ$ for which multiplicity of solutions holds. The numerical experiments are based on the Poincaré-Miranda theorem and the shooting method, which have been lesser explored for systems of ODEs. Our work is motivated by the works of Ambrosetti et al., 1994 and Moreira dos Santos, 2009.
title Variational and numerical aspects of a system of ODEs with concave-convex nonlinerities
topic Functional Analysis
34A34, 34B08, 34B18, 35J35
url https://arxiv.org/abs/2408.10630