Non-autonomous Morse-smale dynamical systems: structural stability under non-autonomous perturbations (2017)
- Autor:
- Autor USP: CARVALHO, ALEXANDRE NOLASCO DE - ICMC
- Unidade: ICMC
- Subjects: SISTEMAS DINÂMICOS; ATRATORES
- Language: Inglês
- Imprenta:
- Source:
- Título do periódico: [Abstracts]
- Conference titles: Congress Gafevol
-
ABNT
CARVALHO, Alexandre Nolasco de. Non-autonomous Morse-smale dynamical systems: structural stability under non-autonomous perturbations. 2017, Anais.. Brasília: UnB, 2017. Disponível em: http://gafevol.mat.unb.br/upload/livro%20GAFEVOL.pdf. Acesso em: 18 abr. 2024. -
APA
Carvalho, A. N. de. (2017). Non-autonomous Morse-smale dynamical systems: structural stability under non-autonomous perturbations. In [Abstracts]. Brasília: UnB. Recuperado de http://gafevol.mat.unb.br/upload/livro%20GAFEVOL.pdf -
NLM
Carvalho AN de. Non-autonomous Morse-smale dynamical systems: structural stability under non-autonomous perturbations [Internet]. [Abstracts]. 2017 ;[citado 2024 abr. 18 ] Available from: http://gafevol.mat.unb.br/upload/livro%20GAFEVOL.pdf -
Vancouver
Carvalho AN de. Non-autonomous Morse-smale dynamical systems: structural stability under non-autonomous perturbations [Internet]. [Abstracts]. 2017 ;[citado 2024 abr. 18 ] Available from: http://gafevol.mat.unb.br/upload/livro%20GAFEVOL.pdf - Parabolic approximation of damped wave equations via fractional powers: fast growing nonlinearities and continuity of the dynamics
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- Continuity of attractors for a semilinear wave equation with variable coefficients
- Patterns in parabolic problems with nonlinear boundary conditions
- Non-autonomous perturbation of autonomous semilinear differential equations: continuity of local stable and unstable manifolds
- Continuity of the dynamics in a localized large diffusion problem with nonlinear boundary conditions
- Exponential global attractors for semigroups in metric spaces with applications to differential equations
- Continuity of dynamical structures for non-autonomous evolution equations under singular perturbations
- A gradient-like non-autonomous evolution process
- Equi-exponential attraction and rate of convergence of attractors with application to a perturbed damped wave equation
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