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Filtros : "EQUAÇÕES DIFERENCIAIS PARCIAIS" "Financiamento PROEX/CAPES" Removidos: "Bioquímica" "SBrT" "NUTRIÇÃO HUMANA" Limpar

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  • Artigo de periodico

    A unified theory for inertial manifolds, saddle point property and exponential dichotomy (2025)

    Carvalho, Alexandre Nolasco de ; Lappicy, Phillipo ; Moreira, Estefani Moraes ; Oliveira-Sousa, Alexandre do Nascimento

    Source: Journal of Differential Equations. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS PARCIAIS, SISTEMAS DISSIPATIVO

    PrivadoAcesso à fonteDOIHow to cite
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    • ABNT

      CARVALHO, Alexandre Nolasco de et al. A unified theory for inertial manifolds, saddle point property and exponential dichotomy. Journal of Differential Equations, v. 416, n. Ja 2025, p. 1462-1495, 2025Tradução . . Disponível em: https://doi.org/10.1016/j.jde.2024.10.029. Acesso em: 16 nov. 2024.

    • APA

      Carvalho, A. N. de, Lappicy, P., Moreira, E. M., & Oliveira-Sousa, A. do N. (2025). A unified theory for inertial manifolds, saddle point property and exponential dichotomy. Journal of Differential Equations, 416( Ja 2025), 1462-1495. doi:10.1016/j.jde.2024.10.029

    • NLM

      Carvalho AN de, Lappicy P, Moreira EM, Oliveira-Sousa A do N. A unified theory for inertial manifolds, saddle point property and exponential dichotomy [Internet]. Journal of Differential Equations. 2025 ; 416( Ja 2025): 1462-1495.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1016/j.jde.2024.10.029

    • Vancouver

      Carvalho AN de, Lappicy P, Moreira EM, Oliveira-Sousa A do N. A unified theory for inertial manifolds, saddle point property and exponential dichotomy [Internet]. Journal of Differential Equations. 2025 ; 416( Ja 2025): 1462-1495.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1016/j.jde.2024.10.029

  • Artigo de periodico

    Spectral analysis and exponential stability of a generalized fractional Moore-Gibson-Thompson equation (2025)

    Bezerra, Flank David Morais ; Santos, Lucas Araújo ; Silva, Maria; Takaessu Junior, Carlos Roberto

    Source: Discrete and Continuous Dynamical Systems : Series B. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS PARCIAIS, OPERADORES LINEARES

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    • ABNT

      BEZERRA, Flank David Morais et al. Spectral analysis and exponential stability of a generalized fractional Moore-Gibson-Thompson equation. Discrete and Continuous Dynamical Systems : Series B, v. 30, n. 2, p. 496-508, 2025Tradução . . Disponível em: https://doi.org/10.3934/dcdsb.2024098. Acesso em: 16 nov. 2024.

    • APA

      Bezerra, F. D. M., Santos, L. A., Silva, M., & Takaessu Junior, C. R. (2025). Spectral analysis and exponential stability of a generalized fractional Moore-Gibson-Thompson equation. Discrete and Continuous Dynamical Systems : Series B, 30( 2), 496-508. doi:10.3934/dcdsb.2024098

    • NLM

      Bezerra FDM, Santos LA, Silva M, Takaessu Junior CR. Spectral analysis and exponential stability of a generalized fractional Moore-Gibson-Thompson equation [Internet]. Discrete and Continuous Dynamical Systems : Series B. 2025 ; 30( 2): 496-508.[citado 2024 nov. 16 ] Available from: https://doi.org/10.3934/dcdsb.2024098

    • Vancouver

      Bezerra FDM, Santos LA, Silva M, Takaessu Junior CR. Spectral analysis and exponential stability of a generalized fractional Moore-Gibson-Thompson equation [Internet]. Discrete and Continuous Dynamical Systems : Series B. 2025 ; 30( 2): 496-508.[citado 2024 nov. 16 ] Available from: https://doi.org/10.3934/dcdsb.2024098

  • Artigo de periodico

    Interaction between crowding and growth in tumours with stem cells: conceptual mathematical modelling (2023)

    Meacci, Luca ; Primicerio, Mario

    Source: Mathematical Modelling of Natural Phenomena. Unidade: ICMC

    Subjects: MODELOS MATEMÁTICOS, EQUAÇÕES DIFERENCIAIS PARCIAIS, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, CÉLULAS-TRONCO, NEOPLASIAS

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    • ABNT

      MEACCI, Luca e PRIMICERIO, Mario. Interaction between crowding and growth in tumours with stem cells: conceptual mathematical modelling. Mathematical Modelling of Natural Phenomena, v. 18, p. 1-22, 2023Tradução . . Disponível em: https://doi.org/10.1051/mmnp/2023011. Acesso em: 16 nov. 2024.

    • APA

      Meacci, L., & Primicerio, M. (2023). Interaction between crowding and growth in tumours with stem cells: conceptual mathematical modelling. Mathematical Modelling of Natural Phenomena, 18, 1-22. doi:10.1051/mmnp/2023011

    • NLM

      Meacci L, Primicerio M. Interaction between crowding and growth in tumours with stem cells: conceptual mathematical modelling [Internet]. Mathematical Modelling of Natural Phenomena. 2023 ; 18 1-22.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1051/mmnp/2023011

    • Vancouver

      Meacci L, Primicerio M. Interaction between crowding and growth in tumours with stem cells: conceptual mathematical modelling [Internet]. Mathematical Modelling of Natural Phenomena. 2023 ; 18 1-22.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1051/mmnp/2023011

  • Artigo de periodico

    Continuity and topological structural stability for nonautonomous random attractors (2022)

    Caraballo, Tomás ; Langa, José Antonio ; Carvalho, Alexandre Nolasco de ; Oliveira-Sousa, Alexandre do Nascimento

    Source: Stochastics and Dynamics. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS PARCIAIS, EQUAÇÕES DIFERENCIAIS ESTOCÁSTICAS, ATRATORES, SISTEMAS DISSIPATIVO, EQUAÇÕES DA ONDA

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    • ABNT

      CARABALLO, Tomás et al. Continuity and topological structural stability for nonautonomous random attractors. Stochastics and Dynamics, v. No 2022, n. 7, p. 2240024-1-2240024-28, 2022Tradução . . Disponível em: https://doi.org/10.1142/S021949372240024X. Acesso em: 16 nov. 2024.

    • APA

      Caraballo, T., Langa, J. A., Carvalho, A. N. de, & Oliveira-Sousa, A. do N. (2022). Continuity and topological structural stability for nonautonomous random attractors. Stochastics and Dynamics, No 2022( 7), 2240024-1-2240024-28. doi:10.1142/S021949372240024X

    • NLM

      Caraballo T, Langa JA, Carvalho AN de, Oliveira-Sousa A do N. Continuity and topological structural stability for nonautonomous random attractors [Internet]. Stochastics and Dynamics. 2022 ; No 2022( 7): 2240024-1-2240024-28.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1142/S021949372240024X

    • Vancouver

      Caraballo T, Langa JA, Carvalho AN de, Oliveira-Sousa A do N. Continuity and topological structural stability for nonautonomous random attractors [Internet]. Stochastics and Dynamics. 2022 ; No 2022( 7): 2240024-1-2240024-28.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1142/S021949372240024X

  • Artigo de periodico

    Stability and hyperbolicity of equilibria for a scalar nonlocal one-dimensional quasilinear parabolic problem (2021)

    Carvalho, Alexandre Nolasco de ; Moreira, Estefani Moraes

    Source: Journal of Differential Equations. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS PARCIAIS, TEORIA DA BIFURCAÇÃO, ATRATORES, OPERADORES

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    • ABNT

      CARVALHO, Alexandre Nolasco de e MOREIRA, Estefani Moraes. Stability and hyperbolicity of equilibria for a scalar nonlocal one-dimensional quasilinear parabolic problem. Journal of Differential Equations, v. No 2021, p. 312-336, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.jde.2021.07.044. Acesso em: 16 nov. 2024.

    • APA

      Carvalho, A. N. de, & Moreira, E. M. (2021). Stability and hyperbolicity of equilibria for a scalar nonlocal one-dimensional quasilinear parabolic problem. Journal of Differential Equations, No 2021, 312-336. doi:10.1016/j.jde.2021.07.044

    • NLM

      Carvalho AN de, Moreira EM. Stability and hyperbolicity of equilibria for a scalar nonlocal one-dimensional quasilinear parabolic problem [Internet]. Journal of Differential Equations. 2021 ; No 2021 312-336.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1016/j.jde.2021.07.044

    • Vancouver

      Carvalho AN de, Moreira EM. Stability and hyperbolicity of equilibria for a scalar nonlocal one-dimensional quasilinear parabolic problem [Internet]. Journal of Differential Equations. 2021 ; No 2021 312-336.[citado 2024 nov. 16 ] Available from: https://doi.org/10.1016/j.jde.2021.07.044
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