Stability for measure neutral functional differential equations (2014)
- Authors:
- Autor USP: FEDERSON, MÁRCIA CRISTINA ANDERSON BRAZ - ICMC
- Unidade: ICMC
- Assunto: EQUAÇÕES DIFERENCIAIS FUNCIONAIS
- Language: Inglês
- Imprenta:
- Publisher: ICMC-USP
- Publisher place: São Carlos
- Date published: 2014
- Source:
- Título: Abstracts
- Conference titles: ICMC Summer Meeting on Differential Equations
-
ABNT
TACURI, Patricia H e FEDERSON, Marcia. Stability for measure neutral functional differential equations. 2014, Anais.. São Carlos: ICMC-USP, 2014. Disponível em: http://summer.icmc.usp.br/summers/summer14/pg_abstract.php. Acesso em: 03 jan. 2026. -
APA
Tacuri, P. H., & Federson, M. (2014). Stability for measure neutral functional differential equations. In Abstracts. São Carlos: ICMC-USP. Recuperado de http://summer.icmc.usp.br/summers/summer14/pg_abstract.php -
NLM
Tacuri PH, Federson M. Stability for measure neutral functional differential equations [Internet]. Abstracts. 2014 ;[citado 2026 jan. 03 ] Available from: http://summer.icmc.usp.br/summers/summer14/pg_abstract.php -
Vancouver
Tacuri PH, Federson M. Stability for measure neutral functional differential equations [Internet]. Abstracts. 2014 ;[citado 2026 jan. 03 ] Available from: http://summer.icmc.usp.br/summers/summer14/pg_abstract.php - A new continuous dependence result for impulsive retarded functional differential equations
- Theory of oscillations for functional differential equations with implulses
- Prolongation of solutions of measure differential equations and dynamic equations on time scales
- Oscillation by impulses for a second-order delay differential equation
- Limit sets and the Poincaré-Bendixson theorem in impulsive semidynamical systems
- Measure functional differential equations and functional dynamic equations on time scales
- Oscillation for a second-order neutral differential equation with impulses
- Converse Lyapunov theorems for retarded functionl differential equations
- Topologic conjugation and asymptotic stability in impulsive semidynamical systems
- Discontinuous local semiflows for Kurzweil equations leading to Lasalle's invariance principle for differential systems with impulses at variable times
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