Integral stability for functional differential equations of the neutral type (1981)
- Authors:
- Autor USP: IZE, ANTONIO FERNANDES - ICMC
- Unidade: ICMC
- Assunto: EQUAÇÕES DIFERENCIAIS ORDINÁRIAS
- Language: Inglês
- Imprenta:
- Publisher place: Rio de Janeiro
- Date published: 1981
- Source:
- Título do periódico: Anais da Academia Brasileira de Ciências
- ISSN: 1678-2690
- Volume/Número/Paginação/Ano: v. 53, n.2, p. 261-267, 1981
-
ABNT
IZÉ, Antonio Fernandes e FREIRIA, A A. Integral stability for functional differential equations of the neutral type. Anais da Academia Brasileira de Ciências, v. 53, n. 2, p. 261-267, 1981Tradução . . Acesso em: 28 mar. 2024. -
APA
Izé, A. F., & Freiria, A. A. (1981). Integral stability for functional differential equations of the neutral type. Anais da Academia Brasileira de Ciências, 53( 2), 261-267. -
NLM
Izé AF, Freiria AA. Integral stability for functional differential equations of the neutral type. Anais da Academia Brasileira de Ciências. 1981 ; 53( 2): 261-267.[citado 2024 mar. 28 ] -
Vancouver
Izé AF, Freiria AA. Integral stability for functional differential equations of the neutral type. Anais da Academia Brasileira de Ciências. 1981 ; 53( 2): 261-267.[citado 2024 mar. 28 ] - Infinite dimensional extension of theorems of hartman and witner on monotone positive solutions of ordinary differential equations
- Total stability for neutral functional differential equations
- Some results on the stability of neutral functional differential equations
- Conributions to stability of neutral functional differential equations
- Stability of perturbed neutral functional differential equations
- Asymptotically autonomous neutral functional differential equations with time-dependent lag
- Lyapunov numbers for a countable systems of ordinary differential equations
- Lyapunov numbers for a countable system of ordinary differential equations
- Asymptotic behavior and nonoscillation of Volterra integral equations and functional differential equations
- Asymptotic integration of nonlinear systems of ordinary differential equations
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