Filtros : "Indexado no Zentralblatt MATH" "TEORIA QUALITATIVA" Removido: "2015" Limpar

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  • Source: Nonlinearity. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, TEORIA DA BIFURCAÇÃO, SISTEMAS DINÂMICOS, SIMETRIA, MECÂNICA ESTATÍSTICA, ESTABILIDADE ESTRUTURAL (EQUAÇÕES DIFERENCIAIS ORDINÁRIAS)

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      AMORIM, Tiago de Albuquerque e MANOEL, Miriam Garcia. The realisation of admissible graphs for coupled vector fields. Nonlinearity, v. 37, n. Ja 2024, p. 1-26, 2024Tradução . . Disponível em: https://doi.org/10.1088/1361-6544/ad0ca4. Acesso em: 31 out. 2024.
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      Amorim, T. de A., & Manoel, M. G. (2024). The realisation of admissible graphs for coupled vector fields. Nonlinearity, 37( Ja 2024), 1-26. doi:10.1088/1361-6544/ad0ca4
    • NLM

      Amorim T de A, Manoel MG. The realisation of admissible graphs for coupled vector fields [Internet]. Nonlinearity. 2024 ; 37( Ja 2024): 1-26.[citado 2024 out. 31 ] Available from: https://doi.org/10.1088/1361-6544/ad0ca4
    • Vancouver

      Amorim T de A, Manoel MG. The realisation of admissible graphs for coupled vector fields [Internet]. Nonlinearity. 2024 ; 37( Ja 2024): 1-26.[citado 2024 out. 31 ] Available from: https://doi.org/10.1088/1361-6544/ad0ca4
  • Source: Differential Equations and Dynamical Systems. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, SISTEMAS DINÂMICOS

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      BALDISSERA, Maíra Duran e LLIBRE, Jaume e OLIVEIRA, Regilene Delazari dos Santos. Dynamics of a generalized rayleigh system. Differential Equations and Dynamical Systems, v. 32, n. 3, p. 933-941, 2024Tradução . . Disponível em: https://doi.org/10.1007/s12591-022-00604-z. Acesso em: 31 out. 2024.
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      Baldissera, M. D., Llibre, J., & Oliveira, R. D. dos S. (2024). Dynamics of a generalized rayleigh system. Differential Equations and Dynamical Systems, 32( 3), 933-941. doi:10.1007/s12591-022-00604-z
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      Baldissera MD, Llibre J, Oliveira RD dos S. Dynamics of a generalized rayleigh system [Internet]. Differential Equations and Dynamical Systems. 2024 ; 32( 3): 933-941.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s12591-022-00604-z
    • Vancouver

      Baldissera MD, Llibre J, Oliveira RD dos S. Dynamics of a generalized rayleigh system [Internet]. Differential Equations and Dynamical Systems. 2024 ; 32( 3): 933-941.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s12591-022-00604-z
  • Source: Journal of Differential Equations. Unidade: ICMC

    Subjects: SISTEMAS DINÂMICOS, TEORIA QUALITATIVA, SISTEMAS DIFERENCIAIS

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      BRAUN, Francisco e FERNANDES, Filipe. On Reeb components of nonsingular polynomial differential systems on the real plane. Journal of Differential Equations, v. 320, p. 469-478, 2022Tradução . . Disponível em: https://doi.org/10.1016/j.jde.2022.03.002. Acesso em: 31 out. 2024.
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      Braun, F., & Fernandes, F. (2022). On Reeb components of nonsingular polynomial differential systems on the real plane. Journal of Differential Equations, 320, 469-478. doi:10.1016/j.jde.2022.03.002
    • NLM

      Braun F, Fernandes F. On Reeb components of nonsingular polynomial differential systems on the real plane [Internet]. Journal of Differential Equations. 2022 ; 320 469-478.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.jde.2022.03.002
    • Vancouver

      Braun F, Fernandes F. On Reeb components of nonsingular polynomial differential systems on the real plane [Internet]. Journal of Differential Equations. 2022 ; 320 469-478.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.jde.2022.03.002
  • Source: Qualitative Theory of Dynamical Systems. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, TEORIA DA BIFURCAÇÃO, SOLUÇÕES PERIÓDICAS

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      OLIVEIRA, Regilene Delazari dos Santos e SÁNCHEZ-SÁNCHEZ, Iván e TORREGROSA, Joan. Simultaneous bifurcation of limit cycles and critical periods. Qualitative Theory of Dynamical Systems, v. 21, n. 1, p. 1-35, 2022Tradução . . Disponível em: https://doi.org/10.1007/s12346-021-00546-x. Acesso em: 31 out. 2024.
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      Oliveira, R. D. dos S., Sánchez-Sánchez, I., & Torregrosa, J. (2022). Simultaneous bifurcation of limit cycles and critical periods. Qualitative Theory of Dynamical Systems, 21( 1), 1-35. doi:10.1007/s12346-021-00546-x
    • NLM

      Oliveira RD dos S, Sánchez-Sánchez I, Torregrosa J. Simultaneous bifurcation of limit cycles and critical periods [Internet]. Qualitative Theory of Dynamical Systems. 2022 ; 21( 1): 1-35.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s12346-021-00546-x
    • Vancouver

      Oliveira RD dos S, Sánchez-Sánchez I, Torregrosa J. Simultaneous bifurcation of limit cycles and critical periods [Internet]. Qualitative Theory of Dynamical Systems. 2022 ; 21( 1): 1-35.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s12346-021-00546-x
  • Source: Revista Matemática Complutense. Unidade: ICMC

    Subjects: TEORIA DAS SINGULARIDADES, TEORIA QUALITATIVA, INVARIANTES

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      OLIVEIRA, Regilene Delazari dos Santos et al. Characterization and bifurcation diagram of the family of quadratic differential systems with an invariant ellipse in terms of invariant polynomials. Revista Matemática Complutense, v. 35, n. 2, p. 361-413, 2022Tradução . . Disponível em: https://doi.org/10.1007/s13163-021-00398-8. Acesso em: 31 out. 2024.
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      Oliveira, R. D. dos S., Rezende, A. C., Schlomiuk, D., & Vulpe, N. (2022). Characterization and bifurcation diagram of the family of quadratic differential systems with an invariant ellipse in terms of invariant polynomials. Revista Matemática Complutense, 35( 2), 361-413. doi:10.1007/s13163-021-00398-8
    • NLM

      Oliveira RD dos S, Rezende AC, Schlomiuk D, Vulpe N. Characterization and bifurcation diagram of the family of quadratic differential systems with an invariant ellipse in terms of invariant polynomials [Internet]. Revista Matemática Complutense. 2022 ; 35( 2): 361-413.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s13163-021-00398-8
    • Vancouver

      Oliveira RD dos S, Rezende AC, Schlomiuk D, Vulpe N. Characterization and bifurcation diagram of the family of quadratic differential systems with an invariant ellipse in terms of invariant polynomials [Internet]. Revista Matemática Complutense. 2022 ; 35( 2): 361-413.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s13163-021-00398-8
  • Source: Journal of Differential Equations. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, TEORIA DA BIFURCAÇÃO, SISTEMAS DINÂMICOS

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      ITIKAWA, Jackson e OLIVEIRA, Regilene Delazari dos Santos e TORREGROSA, Joan. First-order perturbation for multi-parameter center families. Journal of Differential Equations, v. 309, p. 291-310, 2022Tradução . . Disponível em: https://doi.org/10.1016/j.jde.2021.11.035. Acesso em: 31 out. 2024.
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      Itikawa, J., Oliveira, R. D. dos S., & Torregrosa, J. (2022). First-order perturbation for multi-parameter center families. Journal of Differential Equations, 309, 291-310. doi:10.1016/j.jde.2021.11.035
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      Itikawa J, Oliveira RD dos S, Torregrosa J. First-order perturbation for multi-parameter center families [Internet]. Journal of Differential Equations. 2022 ; 309 291-310.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.jde.2021.11.035
    • Vancouver

      Itikawa J, Oliveira RD dos S, Torregrosa J. First-order perturbation for multi-parameter center families [Internet]. Journal of Differential Equations. 2022 ; 309 291-310.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.jde.2021.11.035
  • Source: Mathematical Methods in the Applied Sciences. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, SOLUÇÕES PERIÓDICAS, SISTEMAS DIFERENCIAIS

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      LLIBRE, Jaume e OLIVEIRA, Regilene Delazari dos Santos. On the limit cycle of a Belousov-Zhabotinsky differential systems. Mathematical Methods in the Applied Sciences, v. 45, n. Ja 2022, p. 579-584, 2022Tradução . . Disponível em: https://doi.org/10.1002/mma.7798. Acesso em: 31 out. 2024.
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      Llibre, J., & Oliveira, R. D. dos S. (2022). On the limit cycle of a Belousov-Zhabotinsky differential systems. Mathematical Methods in the Applied Sciences, 45( Ja 2022), 579-584. doi:10.1002/mma.7798
    • NLM

      Llibre J, Oliveira RD dos S. On the limit cycle of a Belousov-Zhabotinsky differential systems [Internet]. Mathematical Methods in the Applied Sciences. 2022 ; 45( Ja 2022): 579-584.[citado 2024 out. 31 ] Available from: https://doi.org/10.1002/mma.7798
    • Vancouver

      Llibre J, Oliveira RD dos S. On the limit cycle of a Belousov-Zhabotinsky differential systems [Internet]. Mathematical Methods in the Applied Sciences. 2022 ; 45( Ja 2022): 579-584.[citado 2024 out. 31 ] Available from: https://doi.org/10.1002/mma.7798
  • Source: Topological Methods in Nonlinear Analysis. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, INVARIANTES, TEORIA DA BIFURCAÇÃO, SISTEMAS DIFERENCIAIS

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      MOTA, Marcos Coutinho et al. Geometric analysis of quadratic differential systems with invariant ellipses. Topological Methods in Nonlinear Analysis, v. 59, n. 2A, p. 623-685, 2022Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2021.063. Acesso em: 31 out. 2024.
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      Mota, M. C., Rezende, A. C., Schlomiuk, D., & Vulpe, N. (2022). Geometric analysis of quadratic differential systems with invariant ellipses. Topological Methods in Nonlinear Analysis, 59( 2A), 623-685. doi:10.12775/TMNA.2021.063
    • NLM

      Mota MC, Rezende AC, Schlomiuk D, Vulpe N. Geometric analysis of quadratic differential systems with invariant ellipses [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 59( 2A): 623-685.[citado 2024 out. 31 ] Available from: https://doi.org/10.12775/TMNA.2021.063
    • Vancouver

      Mota MC, Rezende AC, Schlomiuk D, Vulpe N. Geometric analysis of quadratic differential systems with invariant ellipses [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 59( 2A): 623-685.[citado 2024 out. 31 ] Available from: https://doi.org/10.12775/TMNA.2021.063
  • Source: Topological Methods in Nonlinear Analysis. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, SOLUÇÕES PERIÓDICAS, INTEGRAL DE DENJOY, INTEGRAL DE PERRON, TEOREMA DO PONTO FIXO

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      FEDERSON, Marcia e GRAU, Rogelio e MACENA, Maria Carolina Stefani Mesquita. Affine-periodic solutions for generalized ODEs and other equations. Topological Methods in Nonlinear Analysis, v. 60, n. 2, p. 725-760, 2022Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2022.027. Acesso em: 31 out. 2024.
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      Federson, M., Grau, R., & Macena, M. C. S. M. (2022). Affine-periodic solutions for generalized ODEs and other equations. Topological Methods in Nonlinear Analysis, 60( 2), 725-760. doi:10.12775/TMNA.2022.027
    • NLM

      Federson M, Grau R, Macena MCSM. Affine-periodic solutions for generalized ODEs and other equations [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 60( 2): 725-760.[citado 2024 out. 31 ] Available from: https://doi.org/10.12775/TMNA.2022.027
    • Vancouver

      Federson M, Grau R, Macena MCSM. Affine-periodic solutions for generalized ODEs and other equations [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 60( 2): 725-760.[citado 2024 out. 31 ] Available from: https://doi.org/10.12775/TMNA.2022.027
  • Source: Electronic Journal of Qualitative Theory of Differential Equations. Unidade: ICMC

    Subjects: SINGULARIDADES, TEORIA QUALITATIVA, INVARIANTES

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      OLIVEIRA, Regilene Delazari dos Santos et al. Geometry, integrability and bifurcation diagrams of a family of quadratic differential systems as application of the Darboux theory of integrability. Electronic Journal of Qualitative Theory of Differential Equations, v. 2021, n. 45, p. 1-90, 2021Tradução . . Disponível em: https://doi.org/10.14232/ejqtde.2021.1.45. Acesso em: 31 out. 2024.
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      Oliveira, R. D. dos S., Schlomiuk, D., Travaglini, A. M., & Valls, C. (2021). Geometry, integrability and bifurcation diagrams of a family of quadratic differential systems as application of the Darboux theory of integrability. Electronic Journal of Qualitative Theory of Differential Equations, 2021( 45), 1-90. doi:10.14232/ejqtde.2021.1.45
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      Oliveira RD dos S, Schlomiuk D, Travaglini AM, Valls C. Geometry, integrability and bifurcation diagrams of a family of quadratic differential systems as application of the Darboux theory of integrability [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 45): 1-90.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.45
    • Vancouver

      Oliveira RD dos S, Schlomiuk D, Travaglini AM, Valls C. Geometry, integrability and bifurcation diagrams of a family of quadratic differential systems as application of the Darboux theory of integrability [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 45): 1-90.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.45
  • Source: European Journal of Applied Mathematics. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, SISTEMAS DINÂMICOS

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      LLIBRE, Jaume e OLIVEIRA, Regilene Delazari dos Santos e ZHAO, Yulin. On the birth and death of algebraic limit cycles in quadratic differential systems. European Journal of Applied Mathematics, v. 32, n. 2, p. 317-336, 2021Tradução . . Disponível em: https://doi.org/10.1017/S0956792520000145. Acesso em: 31 out. 2024.
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      Llibre, J., Oliveira, R. D. dos S., & Zhao, Y. (2021). On the birth and death of algebraic limit cycles in quadratic differential systems. European Journal of Applied Mathematics, 32( 2), 317-336. doi:10.1017/S0956792520000145
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      Llibre J, Oliveira RD dos S, Zhao Y. On the birth and death of algebraic limit cycles in quadratic differential systems [Internet]. European Journal of Applied Mathematics. 2021 ; 32( 2): 317-336.[citado 2024 out. 31 ] Available from: https://doi.org/10.1017/S0956792520000145
    • Vancouver

      Llibre J, Oliveira RD dos S, Zhao Y. On the birth and death of algebraic limit cycles in quadratic differential systems [Internet]. European Journal of Applied Mathematics. 2021 ; 32( 2): 317-336.[citado 2024 out. 31 ] Available from: https://doi.org/10.1017/S0956792520000145
  • Source: Journal of Dynamics and Differential Equations. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, EQUAÇÕES NÃO LINEARES, SISTEMAS NÃO LINEARES

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      ARTÉS, Joan C e OLIVEIRA, Regilene Delazari dos Santos e REZENDE, Alex Carlucci. Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes. Journal of Dynamics and Differential Equations, v. 33, n. 4, p. 1779-1821, 2021Tradução . . Disponível em: https://doi.org/10.1007/s10884-020-09871-2. Acesso em: 31 out. 2024.
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      Artés, J. C., Oliveira, R. D. dos S., & Rezende, A. C. (2021). Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes. Journal of Dynamics and Differential Equations, 33( 4), 1779-1821. doi:10.1007/s10884-020-09871-2
    • NLM

      Artés JC, Oliveira RD dos S, Rezende AC. Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes [Internet]. Journal of Dynamics and Differential Equations. 2021 ; 33( 4): 1779-1821.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s10884-020-09871-2
    • Vancouver

      Artés JC, Oliveira RD dos S, Rezende AC. Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes [Internet]. Journal of Dynamics and Differential Equations. 2021 ; 33( 4): 1779-1821.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s10884-020-09871-2
  • Source: Electronic Journal of Differential Equations. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, EQUAÇÕES NÃO LINEARES, SISTEMAS NÃO LINEARES, TEORIA DA BIFURCAÇÃO, INVARIANTES

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      LLIBRE, Jaume e OLIVEIRA, Regilene Delazari dos Santos e RODRIGUES, Camila Aparecida Benedito. Quadratic systems with an invariant algebraic curve of degree 3 and a Darboux invariant. Electronic Journal of Differential Equations, v. 69, p. 1-52, 2021Tradução . . Disponível em: https://ejde.math.txstate.edu/. Acesso em: 31 out. 2024.
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      Llibre, J., Oliveira, R. D. dos S., & Rodrigues, C. A. B. (2021). Quadratic systems with an invariant algebraic curve of degree 3 and a Darboux invariant. Electronic Journal of Differential Equations, 69, 1-52. Recuperado de https://ejde.math.txstate.edu/
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      Llibre J, Oliveira RD dos S, Rodrigues CAB. Quadratic systems with an invariant algebraic curve of degree 3 and a Darboux invariant [Internet]. Electronic Journal of Differential Equations. 2021 ; 69 1-52.[citado 2024 out. 31 ] Available from: https://ejde.math.txstate.edu/
    • Vancouver

      Llibre J, Oliveira RD dos S, Rodrigues CAB. Quadratic systems with an invariant algebraic curve of degree 3 and a Darboux invariant [Internet]. Electronic Journal of Differential Equations. 2021 ; 69 1-52.[citado 2024 out. 31 ] Available from: https://ejde.math.txstate.edu/
  • Source: Bulletin des Sciences Mathématiques. Unidade: ICMC

    Subjects: ANÁLISE REAL, TEORIA QUALITATIVA, TEORIA DA BIFURCAÇÃO, SOLUÇÕES PERIÓDICAS, TEORIA DO GRAU

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      FEDERSON, Marcia e MAWHIN, Jean e MESQUITA, Jaqueline Godoy. Existence of periodic solutions and bifurcation points for generalized ordinary differential equations. Bulletin des Sciences Mathématiques, v. 169, p. 1-31, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.bulsci.2021.102991. Acesso em: 31 out. 2024.
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      Federson, M., Mawhin, J., & Mesquita, J. G. (2021). Existence of periodic solutions and bifurcation points for generalized ordinary differential equations. Bulletin des Sciences Mathématiques, 169, 1-31. doi:10.1016/j.bulsci.2021.102991
    • NLM

      Federson M, Mawhin J, Mesquita JG. Existence of periodic solutions and bifurcation points for generalized ordinary differential equations [Internet]. Bulletin des Sciences Mathématiques. 2021 ; 169 1-31.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.bulsci.2021.102991
    • Vancouver

      Federson M, Mawhin J, Mesquita JG. Existence of periodic solutions and bifurcation points for generalized ordinary differential equations [Internet]. Bulletin des Sciences Mathématiques. 2021 ; 169 1-31.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.bulsci.2021.102991
  • Source: Nonlinear Analysis : Real World Applications. Unidade: ICMC

    Subjects: INVARIANTES, SISTEMAS DIFERENCIAIS, SISTEMAS DINÂMICOS, TEORIA QUALITATIVA

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      MEZA-SARMIENTO, Ingrid Sofia e OLIVEIRA, Regilene Delazari dos Santos e SILVA, Paulo Ricardo da. Quadratic slow-fast systems on the plane. Nonlinear Analysis : Real World Applications, v. 60, p. 1-29, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.nonrwa.2020.103286. Acesso em: 31 out. 2024.
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      Meza-Sarmiento, I. S., Oliveira, R. D. dos S., & Silva, P. R. da. (2021). Quadratic slow-fast systems on the plane. Nonlinear Analysis : Real World Applications, 60, 1-29. doi:10.1016/j.nonrwa.2020.103286
    • NLM

      Meza-Sarmiento IS, Oliveira RD dos S, Silva PR da. Quadratic slow-fast systems on the plane [Internet]. Nonlinear Analysis : Real World Applications. 2021 ; 60 1-29.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.nonrwa.2020.103286
    • Vancouver

      Meza-Sarmiento IS, Oliveira RD dos S, Silva PR da. Quadratic slow-fast systems on the plane [Internet]. Nonlinear Analysis : Real World Applications. 2021 ; 60 1-29.[citado 2024 out. 31 ] Available from: https://doi.org/10.1016/j.nonrwa.2020.103286
  • Source: Regular and Chaotic Dynamics. Unidade: ICMC

    Subjects: SISTEMAS HAMILTONIANOS, SINGULARIDADES, TEORIA QUALITATIVA, MECÂNICA HAMILTONIANA

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      KOURLIOUROS, Konstantinos. Sections of Hamiltonian Systems. Regular and Chaotic Dynamics, v. 26, n. 4, p. 331-349, 2021Tradução . . Disponível em: https://doi.org/10.1134/S156035472104002X. Acesso em: 31 out. 2024.
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      Kourliouros, K. (2021). Sections of Hamiltonian Systems. Regular and Chaotic Dynamics, 26( 4), 331-349. doi:10.1134/S156035472104002X
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      Kourliouros K. Sections of Hamiltonian Systems [Internet]. Regular and Chaotic Dynamics. 2021 ; 26( 4): 331-349.[citado 2024 out. 31 ] Available from: https://doi.org/10.1134/S156035472104002X
    • Vancouver

      Kourliouros K. Sections of Hamiltonian Systems [Internet]. Regular and Chaotic Dynamics. 2021 ; 26( 4): 331-349.[citado 2024 out. 31 ] Available from: https://doi.org/10.1134/S156035472104002X
  • Source: Calculus of Variations and Partial Differential Equations. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS PARCIAIS ELÍTICAS, EQUAÇÕES DIFERENCIAIS PARCIAIS DE 2ª ORDEM, TEORIA QUALITATIVA

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      SILVA, João Vitor da e NORNBERG, Gabrielle. Regularity estimates for fully nonlinear elliptic PDEs with general Hamiltonian terms and unbounded ingredients. Calculus of Variations and Partial Differential Equations, v. 60, n. 6, p. 1-40, 2021Tradução . . Disponível em: https://doi.org/10.1007/s00526-021-02082-7. Acesso em: 31 out. 2024.
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      Silva, J. V. da, & Nornberg, G. (2021). Regularity estimates for fully nonlinear elliptic PDEs with general Hamiltonian terms and unbounded ingredients. Calculus of Variations and Partial Differential Equations, 60( 6), 1-40. doi:10.1007/s00526-021-02082-7
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      Silva JV da, Nornberg G. Regularity estimates for fully nonlinear elliptic PDEs with general Hamiltonian terms and unbounded ingredients [Internet]. Calculus of Variations and Partial Differential Equations. 2021 ; 60( 6): 1-40.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s00526-021-02082-7
    • Vancouver

      Silva JV da, Nornberg G. Regularity estimates for fully nonlinear elliptic PDEs with general Hamiltonian terms and unbounded ingredients [Internet]. Calculus of Variations and Partial Differential Equations. 2021 ; 60( 6): 1-40.[citado 2024 out. 31 ] Available from: https://doi.org/10.1007/s00526-021-02082-7
  • Source: Electronic Journal of Qualitative Theory of Differential Equations. Unidade: ICMC

    Subjects: EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, TEORIA QUALITATIVA

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    • ABNT

      OLIVEIRA, Regilene Delazari dos Santos e SCHLOMIUK, Dana e TRAVAGLINI, Ana Maria. Geometry and integrability of quadratic systems with invariant hyperbolas. Electronic Journal of Qualitative Theory of Differential Equations, v. 2021, n. 6, p. 1-56, 2021Tradução . . Disponível em: https://doi.org/10.14232/ejqtde.2021.1.6. Acesso em: 31 out. 2024.
    • APA

      Oliveira, R. D. dos S., Schlomiuk, D., & Travaglini, A. M. (2021). Geometry and integrability of quadratic systems with invariant hyperbolas. Electronic Journal of Qualitative Theory of Differential Equations, 2021( 6), 1-56. doi:10.14232/ejqtde.2021.1.6
    • NLM

      Oliveira RD dos S, Schlomiuk D, Travaglini AM. Geometry and integrability of quadratic systems with invariant hyperbolas [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 6): 1-56.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.6
    • Vancouver

      Oliveira RD dos S, Schlomiuk D, Travaglini AM. Geometry and integrability of quadratic systems with invariant hyperbolas [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 6): 1-56.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.6
  • Source: Electronic Journal of Qualitative Theory of Differential Equations. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, ANÁLISE GLOBAL

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    • ABNT

      ARTÉS, Joan Carles e MOTA, Marcos Coutinho e REZENDE, Alex Carlucci. Structurally unstable quadratic vector fields of codimension two: families possessing a finite saddle-node and an infinite saddle-node. Electronic Journal of Qualitative Theory of Differential Equations, v. 2021, n. 35, p. 1-89, 2021Tradução . . Disponível em: https://doi.org/10.14232/ejqtde.2021.1.35. Acesso em: 31 out. 2024.
    • APA

      Artés, J. C., Mota, M. C., & Rezende, A. C. (2021). Structurally unstable quadratic vector fields of codimension two: families possessing a finite saddle-node and an infinite saddle-node. Electronic Journal of Qualitative Theory of Differential Equations, 2021( 35), 1-89. doi:10.14232/ejqtde.2021.1.35
    • NLM

      Artés JC, Mota MC, Rezende AC. Structurally unstable quadratic vector fields of codimension two: families possessing a finite saddle-node and an infinite saddle-node [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 35): 1-89.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.35
    • Vancouver

      Artés JC, Mota MC, Rezende AC. Structurally unstable quadratic vector fields of codimension two: families possessing a finite saddle-node and an infinite saddle-node [Internet]. Electronic Journal of Qualitative Theory of Differential Equations. 2021 ; 2021( 35): 1-89.[citado 2024 out. 31 ] Available from: https://doi.org/10.14232/ejqtde.2021.1.35
  • Source: Discrete and Continuous Dynamical Systems : Series B. Unidade: ICMC

    Subjects: TEORIA QUALITATIVA, INVARIANTES, ATRATORES, CAOS (SISTEMAS DINÂMICOS)

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    • ABNT

      MOTA, Marcos Coutinho e OLIVEIRA, Regilene Delazari dos Santos. Dynamic aspects of sprott BC chaotic system. Discrete and Continuous Dynamical Systems : Series B, v. 26, n. 3, p. 1653-1673, 2021Tradução . . Disponível em: https://doi.org/10.3934/dcdsb.2020177. Acesso em: 31 out. 2024.
    • APA

      Mota, M. C., & Oliveira, R. D. dos S. (2021). Dynamic aspects of sprott BC chaotic system. Discrete and Continuous Dynamical Systems : Series B, 26( 3), 1653-1673. doi:10.3934/dcdsb.2020177
    • NLM

      Mota MC, Oliveira RD dos S. Dynamic aspects of sprott BC chaotic system [Internet]. Discrete and Continuous Dynamical Systems : Series B. 2021 ; 26( 3): 1653-1673.[citado 2024 out. 31 ] Available from: https://doi.org/10.3934/dcdsb.2020177
    • Vancouver

      Mota MC, Oliveira RD dos S. Dynamic aspects of sprott BC chaotic system [Internet]. Discrete and Continuous Dynamical Systems : Series B. 2021 ; 26( 3): 1653-1673.[citado 2024 out. 31 ] Available from: https://doi.org/10.3934/dcdsb.2020177

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