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Artigo de periodico
Existence, regularity and asymptotic behavior of solutions for a nonlocal Chafee-Infante problem via semigroup theory (2025)
Caraballo, Tomás ; Carvalho, Alexandre Nolasco de ; Julio Pérez, Yessica Yuliet
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: ATRATORES, EQUAÇÕES DIFERENCIAIS PARCIAIS PARABÓLICAS
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ABNT
CARABALLO, Tomás e CARVALHO, Alexandre Nolasco de e JULIO PÉREZ, Yessica Yuliet. Existence, regularity and asymptotic behavior of solutions for a nonlocal Chafee-Infante problem via semigroup theory. Topological Methods in Nonlinear Analysis, v. 65, n. 2, p. 623-651, 2025Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2024.051. Acesso em: 18 nov. 2025.
APA
Caraballo, T., Carvalho, A. N. de, & Julio Pérez, Y. Y. (2025). Existence, regularity and asymptotic behavior of solutions for a nonlocal Chafee-Infante problem via semigroup theory. Topological Methods in Nonlinear Analysis, 65( 2), 623-651. doi:10.12775/TMNA.2024.051
NLM
Caraballo T, Carvalho AN de, Julio Pérez YY. Existence, regularity and asymptotic behavior of solutions for a nonlocal Chafee-Infante problem via semigroup theory [Internet]. Topological Methods in Nonlinear Analysis. 2025 ; 65( 2): 623-651.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2024.051
Vancouver
Caraballo T, Carvalho AN de, Julio Pérez YY. Existence, regularity and asymptotic behavior of solutions for a nonlocal Chafee-Infante problem via semigroup theory [Internet]. Topological Methods in Nonlinear Analysis. 2025 ; 65( 2): 623-651.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2024.051
Artigo de periodico
Conley index theory for Gutierrez-Sotomayor flows on singular 3-manifolds (2023)
Rezende, Ketty Abaroa de ; Grulha Júnior, Nivaldo de Góes ; Lima, Dahisy Valadão de Souza ; Zigart, Murilo André de Jesus
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: SINGULARIDADES, TEORIA DAS SINGULARIDADES, TEORIA DO ÍNDICE, COBORDISMO, VARIEDADES TOPOLÓGICAS
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REZENDE, Ketty Abaroa de et al. Conley index theory for Gutierrez-Sotomayor flows on singular 3-manifolds. Topological Methods in Nonlinear Analysis, v. 62, n. 1, p. Se 2023, 2023Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2022.070. Acesso em: 18 nov. 2025.
APA
Rezende, K. A. de, Grulha Júnior, N. de G., Lima, D. V. de S., & Zigart, M. A. de J. (2023). Conley index theory for Gutierrez-Sotomayor flows on singular 3-manifolds. Topological Methods in Nonlinear Analysis, 62( 1), Se 2023. doi:10.12775/TMNA.2022.070
NLM
Rezende KA de, Grulha Júnior N de G, Lima DV de S, Zigart MA de J. Conley index theory for Gutierrez-Sotomayor flows on singular 3-manifolds [Internet]. Topological Methods in Nonlinear Analysis. 2023 ; 62( 1): Se 2023.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2022.070
Vancouver
Rezende KA de, Grulha Júnior N de G, Lima DV de S, Zigart MA de J. Conley index theory for Gutierrez-Sotomayor flows on singular 3-manifolds [Internet]. Topological Methods in Nonlinear Analysis. 2023 ; 62( 1): Se 2023.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2022.070
Artigo de periodico
Gutierrez-Sotomayor flows on singular surfaces (2022)
Rezende, Ketty Abaroa de ; Grulha Júnior, Nivaldo de Góes ; Lima, Dahisy Valadão de Souza ; Zigart, Murilo André de Jesus
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: SINGULARIDADES, TEORIA DAS SINGULARIDADES, DINÂMICA TOPOLÓGICA, TEORIA DO ÍNDICE, VARIEDADES TOPOLÓGICAS
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REZENDE, Ketty Abaroa de et al. Gutierrez-Sotomayor flows on singular surfaces. Topological Methods in Nonlinear Analysis, v. 60, n. 1, p. 221-265, 2022Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2021.054. Acesso em: 18 nov. 2025.
APA
Rezende, K. A. de, Grulha Júnior, N. de G., Lima, D. V. de S., & Zigart, M. A. de J. (2022). Gutierrez-Sotomayor flows on singular surfaces. Topological Methods in Nonlinear Analysis, 60( 1), 221-265. doi:10.12775/TMNA.2021.054
NLM
Rezende KA de, Grulha Júnior N de G, Lima DV de S, Zigart MA de J. Gutierrez-Sotomayor flows on singular surfaces [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 60( 1): 221-265.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2021.054
Vancouver
Rezende KA de, Grulha Júnior N de G, Lima DV de S, Zigart MA de J. Gutierrez-Sotomayor flows on singular surfaces [Internet]. Topological Methods in Nonlinear Analysis. 2022 ; 60( 1): 221-265.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2021.054
Artigo de periodico
Affine-periodic solutions for generalized ODEs and other equations (2022)
Federson, Marcia ; Grau, Rogelio ; Macena, Maria Carolina Stefani Mesquita
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: 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: 18 nov. 2025.
APA
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 2025 nov. 18 ] 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 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2022.027
Artigo de periodico
Parabolic equations with localized large diffusion: rate of convergence of attractors (2019)
Carvalho, Alexandre Nolasco de ; Pires, Leonardo
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS PARCIAIS PARABÓLICAS, ATRATORES
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ABNT
CARVALHO, Alexandre Nolasco de e PIRES, Leonardo. Parabolic equations with localized large diffusion: rate of convergence of attractors. Topological Methods in Nonlinear Analysis, v. 53, n. 1, p. 1-23, 2019Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2018.048. Acesso em: 18 nov. 2025.
APA
Carvalho, A. N. de, & Pires, L. (2019). Parabolic equations with localized large diffusion: rate of convergence of attractors. Topological Methods in Nonlinear Analysis, 53( 1), 1-23. doi:10.12775/TMNA.2018.048
NLM
Carvalho AN de, Pires L. Parabolic equations with localized large diffusion: rate of convergence of attractors [Internet]. Topological Methods in Nonlinear Analysis. 2019 ; 53( 1): 1-23.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2018.048
Vancouver
Carvalho AN de, Pires L. Parabolic equations with localized large diffusion: rate of convergence of attractors [Internet]. Topological Methods in Nonlinear Analysis. 2019 ; 53( 1): 1-23.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2018.048
Artigo de periodico
Conley index continuation for a singularly perturbed periodic boundary value problem (2019)
Carbinatto, Maria do Carmo ; Rybakowski, Krzysztof P.
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: TEORIA DO ÍNDICE, TOPOLOGIA DINÂMICA, EQUAÇÕES DIFERENCIAIS PARCIAIS
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ABNT
CARBINATTO, Maria do Carmo e RYBAKOWSKI, Krzysztof P. Conley index continuation for a singularly perturbed periodic boundary value problem. Topological Methods in Nonlinear Analysis, v. 54, n. 1, p. Se 2019, 2019Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2019.023. Acesso em: 18 nov. 2025.
APA
Carbinatto, M. do C., & Rybakowski, K. P. (2019). Conley index continuation for a singularly perturbed periodic boundary value problem. Topological Methods in Nonlinear Analysis, 54( 1), Se 2019. doi:10.12775/TMNA.2019.023
NLM
Carbinatto M do C, Rybakowski KP. Conley index continuation for a singularly perturbed periodic boundary value problem [Internet]. Topological Methods in Nonlinear Analysis. 2019 ; 54( 1): Se 2019.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2019.023
Vancouver
Carbinatto M do C, Rybakowski KP. Conley index continuation for a singularly perturbed periodic boundary value problem [Internet]. Topological Methods in Nonlinear Analysis. 2019 ; 54( 1): Se 2019.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2019.023
Artigo de periodico
Cancellations for circle-valued Morse functions via spectral sequences (2018)
Lima, Dahisy V. de S; Manzoli Neto, Oziride ; Rezende, Ketty A. de; Silveira, Mariana R. da
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: DINÂMICA TOPOLÓGICA, TOPOLOGIA ALGÉBRICA
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ABNT
LIMA, Dahisy V. de S et al. Cancellations for circle-valued Morse functions via spectral sequences. Topological Methods in Nonlinear Analysis, v. 51, n. 1, p. 259-311, 2018Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2017.047. Acesso em: 18 nov. 2025.
APA
Lima, D. V. de S., Manzoli Neto, O., Rezende, K. A. de, & Silveira, M. R. da. (2018). Cancellations for circle-valued Morse functions via spectral sequences. Topological Methods in Nonlinear Analysis, 51( 1), 259-311. doi:10.12775/TMNA.2017.047
NLM
Lima DV de S, Manzoli Neto O, Rezende KA de, Silveira MR da. Cancellations for circle-valued Morse functions via spectral sequences [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 51( 1): 259-311.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.047
Vancouver
Lima DV de S, Manzoli Neto O, Rezende KA de, Silveira MR da. Cancellations for circle-valued Morse functions via spectral sequences [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 51( 1): 259-311.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.047
Artigo de periodico
On spectral convergence for some parabolic problems with locally large diffusion (2018)
Carbinatto, Maria do Carmo ; Rybakowski, Krzysztof P
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS PARCIAIS PARABÓLICAS, TEORIA ESPECTRAL, TEORIA DO ÍNDICE
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CARBINATTO, Maria do Carmo e RYBAKOWSKI, Krzysztof P. On spectral convergence for some parabolic problems with locally large diffusion. Topological Methods in Nonlinear Analysis, v. 52, n. 2, p. 631-664, 2018Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2018.025. Acesso em: 18 nov. 2025.
APA
Carbinatto, M. do C., & Rybakowski, K. P. (2018). On spectral convergence for some parabolic problems with locally large diffusion. Topological Methods in Nonlinear Analysis, 52( 2), 631-664. doi:10.12775/TMNA.2018.025
NLM
Carbinatto M do C, Rybakowski KP. On spectral convergence for some parabolic problems with locally large diffusion [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 52( 2): 631-664.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2018.025
Vancouver
Carbinatto M do C, Rybakowski KP. On spectral convergence for some parabolic problems with locally large diffusion [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 52( 2): 631-664.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2018.025
Artigo de periodico
Singular levels and topological invariants of Morse–Bott foliations on non-orientable surfaces (2018)
Martínez-Alfaro, José; Meza-Sarmiento, Ingrid S; Oliveira, Regilene Delazari dos Santos
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: SISTEMAS DINÂMICOS, TEORIA ERGÓDICA, TOPOLOGIA DIFERENCIAL, TEORIA DAS SINGULARIDADES
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ABNT
MARTÍNEZ-ALFARO, José e MEZA-SARMIENTO, Ingrid S e OLIVEIRA, Regilene Delazari dos Santos. Singular levels and topological invariants of Morse–Bott foliations on non-orientable surfaces. Topological Methods in Nonlinear Analysis, v. 51, n. 1, p. 183-213, 2018Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2017.051. Acesso em: 18 nov. 2025.
APA
Martínez-Alfaro, J., Meza-Sarmiento, I. S., & Oliveira, R. D. dos S. (2018). Singular levels and topological invariants of Morse–Bott foliations on non-orientable surfaces. Topological Methods in Nonlinear Analysis, 51( 1), 183-213. doi:10.12775/TMNA.2017.051
NLM
Martínez-Alfaro J, Meza-Sarmiento IS, Oliveira RD dos S. Singular levels and topological invariants of Morse–Bott foliations on non-orientable surfaces [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 51( 1): 183-213.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.051
Vancouver
Martínez-Alfaro J, Meza-Sarmiento IS, Oliveira RD dos S. Singular levels and topological invariants of Morse–Bott foliations on non-orientable surfaces [Internet]. Topological Methods in Nonlinear Analysis. 2018 ; 51( 1): 183-213.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.051
Artigo de periodico
A note on Conley index and some parabolic problems with locally large diffusion (2017)
Carbinatto, Maria do Carmo ; Rybakowski, Krzysztof P
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: DINÂMICA TOPOLÓGICA, EQUAÇÕES DIFERENCIAIS PARCIAIS PARABÓLICAS
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ABNT
CARBINATTO, Maria do Carmo e RYBAKOWSKI, Krzysztof P. A note on Conley index and some parabolic problems with locally large diffusion. Topological Methods in Nonlinear Analysis, v. 50, n. 2, p. 741-755, 2017Tradução . . Disponível em: https://doi.org/10.12775/TMNA.2017.043. Acesso em: 18 nov. 2025.
APA
Carbinatto, M. do C., & Rybakowski, K. P. (2017). A note on Conley index and some parabolic problems with locally large diffusion. Topological Methods in Nonlinear Analysis, 50( 2), 741-755. doi:10.12775/TMNA.2017.043
NLM
Carbinatto M do C, Rybakowski KP. A note on Conley index and some parabolic problems with locally large diffusion [Internet]. Topological Methods in Nonlinear Analysis. 2017 ; 50( 2): 741-755.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.043
Vancouver
Carbinatto M do C, Rybakowski KP. A note on Conley index and some parabolic problems with locally large diffusion [Internet]. Topological Methods in Nonlinear Analysis. 2017 ; 50( 2): 741-755.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/TMNA.2017.043
Artigo de periodico
Semilinear fractional differential equations: global solutions, critical nonlinearities and comparison results (2015)
Andrade, Bruno de; Carvalho, Alexandre Nolasco de ; Carvalho-Neto, Paulo M; Marín-Rubio, Pedro
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, EQUAÇÕES NÃO LINEARES, EQUAÇÕES DIFERENCIAIS PARCIAIS PARABÓLICAS
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ANDRADE, Bruno de et al. Semilinear fractional differential equations: global solutions, critical nonlinearities and comparison results. Topological Methods in Nonlinear Analysis, v. 45, n. 2, p. 439-467, 2015Tradução . . Disponível em: https://doi.org/10.12775/tmna.2015.022. Acesso em: 18 nov. 2025.
APA
Andrade, B. de, Carvalho, A. N. de, Carvalho-Neto, P. M., & Marín-Rubio, P. (2015). Semilinear fractional differential equations: global solutions, critical nonlinearities and comparison results. Topological Methods in Nonlinear Analysis, 45( 2), 439-467. doi:10.12775/tmna.2015.022
NLM
Andrade B de, Carvalho AN de, Carvalho-Neto PM, Marín-Rubio P. Semilinear fractional differential equations: global solutions, critical nonlinearities and comparison results [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 45( 2): 439-467.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.022
Vancouver
Andrade B de, Carvalho AN de, Carvalho-Neto PM, Marín-Rubio P. Semilinear fractional differential equations: global solutions, critical nonlinearities and comparison results [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 45( 2): 439-467.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.022
Artigo de periodico
Strongly damped wave equation and its Yosida approximations (2015)
Bortolan, Matheus C; Carvalho, Alexandre Nolasco de
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, SISTEMAS DINÂMICOS, ATRATORES
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ABNT
BORTOLAN, Matheus C e CARVALHO, Alexandre Nolasco de. Strongly damped wave equation and its Yosida approximations. Topological Methods in Nonlinear Analysis, v. 46, n. 2, p. 563-602, 2015Tradução . . Disponível em: https://doi.org/10.12775/tmna.2015.059. Acesso em: 18 nov. 2025.
APA
Bortolan, M. C., & Carvalho, A. N. de. (2015). Strongly damped wave equation and its Yosida approximations. Topological Methods in Nonlinear Analysis, 46( 2), 563-602. doi:10.12775/tmna.2015.059
NLM
Bortolan MC, Carvalho AN de. Strongly damped wave equation and its Yosida approximations [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 46( 2): 563-602.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.059
Vancouver
Bortolan MC, Carvalho AN de. Strongly damped wave equation and its Yosida approximations [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 46( 2): 563-602.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.059
Artigo de periodico
Nontrivial solutions for a mixed boundary problem for Schrödinger equations with an external magnetic field (2015)
Alves, Claudianor O; Nemer, Rodrigo C. M; Soares, Sérgio Henrique Monari
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS PARCIAIS, EQUAÇÃO DE SCHRODINGER, GEOMETRIA ALGÉBRICA
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ABNT
ALVES, Claudianor O e NEMER, Rodrigo C. M e SOARES, Sérgio Henrique Monari. Nontrivial solutions for a mixed boundary problem for Schrödinger equations with an external magnetic field. Topological Methods in Nonlinear Analysis, v. 46, n. 1, p. 329-362, 2015Tradução . . Disponível em: https://doi.org/10.12775/tmna.2015.050. Acesso em: 18 nov. 2025.
APA
Alves, C. O., Nemer, R. C. M., & Soares, S. H. M. (2015). Nontrivial solutions for a mixed boundary problem for Schrödinger equations with an external magnetic field. Topological Methods in Nonlinear Analysis, 46( 1), 329-362. doi:10.12775/tmna.2015.050
NLM
Alves CO, Nemer RCM, Soares SHM. Nontrivial solutions for a mixed boundary problem for Schrödinger equations with an external magnetic field [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 46( 1): 329-362.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.050
Vancouver
Alves CO, Nemer RCM, Soares SHM. Nontrivial solutions for a mixed boundary problem for Schrödinger equations with an external magnetic field [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 46( 1): 329-362.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.050
Artigo de periodico
A fourth-order equation with critical growth: the effect of the domain topology (2015)
Melo, Jéssyca Lange Ferreira; Moreira dos Santos, Ederson
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: EQUAÇÕES DIFERENCIAIS PARCIAIS, EQUAÇÕES DIFERENCIAIS PARCIAIS ELÍTICAS
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ABNT
MELO, Jéssyca Lange Ferreira e MOREIRA DOS SANTOS, Ederson. A fourth-order equation with critical growth: the effect of the domain topology. Topological Methods in Nonlinear Analysis, v. 45, n. 2, p. 551-574, 2015Tradução . . Disponível em: https://doi.org/10.12775/tmna.2015.026. Acesso em: 18 nov. 2025.
APA
Melo, J. L. F., & Moreira dos Santos, E. (2015). A fourth-order equation with critical growth: the effect of the domain topology. Topological Methods in Nonlinear Analysis, 45( 2), 551-574. doi:10.12775/tmna.2015.026
NLM
Melo JLF, Moreira dos Santos E. A fourth-order equation with critical growth: the effect of the domain topology [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 45( 2): 551-574.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.026
Vancouver
Melo JLF, Moreira dos Santos E. A fourth-order equation with critical growth: the effect of the domain topology [Internet]. Topological Methods in Nonlinear Analysis. 2015 ; 45( 2): 551-574.[citado 2025 nov. 18 ] Available from: https://doi.org/10.12775/tmna.2015.026
Artigo de periodico
Resolvent convergence for Laplace operators on unbounded curved squeezed domains (2013)
Carbinatto, Maria do Carmo ; Rybakowski, Krzysztof P.
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assunto: EQUAÇÕES DIFERENCIAIS PARCIAIS
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ABNT
CARBINATTO, Maria do Carmo e RYBAKOWSKI, Krzysztof P. Resolvent convergence for Laplace operators on unbounded curved squeezed domains. Topological Methods in Nonlinear Analysis, v. 42, n. 2, p. 233-256, 2013Tradução . . Acesso em: 18 nov. 2025.
APA
Carbinatto, M. do C., & Rybakowski, K. P. (2013). Resolvent convergence for Laplace operators on unbounded curved squeezed domains. Topological Methods in Nonlinear Analysis, 42( 2), 233-256.
NLM
Carbinatto M do C, Rybakowski KP. Resolvent convergence for Laplace operators on unbounded curved squeezed domains. Topological Methods in Nonlinear Analysis. 2013 ; 42( 2): 233-256.[citado 2025 nov. 18 ]
Vancouver
Carbinatto M do C, Rybakowski KP. Resolvent convergence for Laplace operators on unbounded curved squeezed domains. Topological Methods in Nonlinear Analysis. 2013 ; 42( 2): 233-256.[citado 2025 nov. 18 ]
Artigo de periodico
Weak local Nash equilibrium (2013)
Biasi, Carlos ; Monis, Thaís Fernanda Mendes
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assuntos: SINGULARIDADES, TOPOLOGIA
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ABNT
BIASI, Carlos e MONIS, Thaís Fernanda Mendes. Weak local Nash equilibrium. Topological Methods in Nonlinear Analysis, v. 41, n. 2, p. 409-419, 2013Tradução . . Acesso em: 18 nov. 2025.
APA
Biasi, C., & Monis, T. F. M. (2013). Weak local Nash equilibrium. Topological Methods in Nonlinear Analysis, 41( 2), 409-419.
NLM
Biasi C, Monis TFM. Weak local Nash equilibrium. Topological Methods in Nonlinear Analysis. 2013 ; 41( 2): 409-419.[citado 2025 nov. 18 ]
Vancouver
Biasi C, Monis TFM. Weak local Nash equilibrium. Topological Methods in Nonlinear Analysis. 2013 ; 41( 2): 409-419.[citado 2025 nov. 18 ]
Artigo de periodico
Rate of convergence of global attractors of some perturbed reaction-diffusion problems (2013)
Arrieta, José M; Bezerra, Flank David Morais ; Carvalho, Alexandre Nolasco de
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assunto: EQUAÇÕES DIFERENCIAIS PARCIAIS
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ABNT
ARRIETA, José M e BEZERRA, Flank David Morais e CARVALHO, Alexandre Nolasco de. Rate of convergence of global attractors of some perturbed reaction-diffusion problems. Topological Methods in Nonlinear Analysis, v. 41, n. 2, p. 229-253, 2013Tradução . . Acesso em: 18 nov. 2025.
APA
Arrieta, J. M., Bezerra, F. D. M., & Carvalho, A. N. de. (2013). Rate of convergence of global attractors of some perturbed reaction-diffusion problems. Topological Methods in Nonlinear Analysis, 41( 2), 229-253.
NLM
Arrieta JM, Bezerra FDM, Carvalho AN de. Rate of convergence of global attractors of some perturbed reaction-diffusion problems. Topological Methods in Nonlinear Analysis. 2013 ; 41( 2): 229-253.[citado 2025 nov. 18 ]
Vancouver
Arrieta JM, Bezerra FDM, Carvalho AN de. Rate of convergence of global attractors of some perturbed reaction-diffusion problems. Topological Methods in Nonlinear Analysis. 2013 ; 41( 2): 229-253.[citado 2025 nov. 18 ]
Artigo de periodico
Gradient-like nonlinear semigroups with infinitely many equilibria and applications to cascade systems (2013)
Aragão-Costa, Éder Rítis ; Carvalho, Alexandre Nolasco de ; Marín-Rubio, Pedro; Planas, Gabriela
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assunto: EQUAÇÕES DIFERENCIAIS PARCIAIS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
ARAGÃO-COSTA, Éder Rítis et al. Gradient-like nonlinear semigroups with infinitely many equilibria and applications to cascade systems. Topological Methods in Nonlinear Analysis, v. 42, n. 2, p. 345-376, 2013Tradução . . Acesso em: 18 nov. 2025.
APA
Aragão-Costa, É. R., Carvalho, A. N. de, Marín-Rubio, P., & Planas, G. (2013). Gradient-like nonlinear semigroups with infinitely many equilibria and applications to cascade systems. Topological Methods in Nonlinear Analysis, 42( 2), 345-376.
NLM
Aragão-Costa ÉR, Carvalho AN de, Marín-Rubio P, Planas G. Gradient-like nonlinear semigroups with infinitely many equilibria and applications to cascade systems. Topological Methods in Nonlinear Analysis. 2013 ; 42( 2): 345-376.[citado 2025 nov. 18 ]
Vancouver
Aragão-Costa ÉR, Carvalho AN de, Marín-Rubio P, Planas G. Gradient-like nonlinear semigroups with infinitely many equilibria and applications to cascade systems. Topological Methods in Nonlinear Analysis. 2013 ; 42( 2): 345-376.[citado 2025 nov. 18 ]
Artigo de periodico
Continuity of Lyapunov functions and of energy level for a generalized gradient semigroup (2012)
Aragão-Costa, Éder Rítis ; Caraballo, Tomás; Carvalho, Alexandre Nolasco de ; Langa, José A
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assunto: EQUAÇÕES DIFERENCIAIS PARCIAIS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
ARAGÃO-COSTA, Éder Rítis et al. Continuity of Lyapunov functions and of energy level for a generalized gradient semigroup. Topological Methods in Nonlinear Analysis, v. 39, n. 1, p. 57-82, 2012Tradução . . Acesso em: 18 nov. 2025.
APA
Aragão-Costa, É. R., Caraballo, T., Carvalho, A. N. de, & Langa, J. A. (2012). Continuity of Lyapunov functions and of energy level for a generalized gradient semigroup. Topological Methods in Nonlinear Analysis, 39( 1), 57-82.
NLM
Aragão-Costa ÉR, Caraballo T, Carvalho AN de, Langa JA. Continuity of Lyapunov functions and of energy level for a generalized gradient semigroup. Topological Methods in Nonlinear Analysis. 2012 ; 39( 1): 57-82.[citado 2025 nov. 18 ]
Vancouver
Aragão-Costa ÉR, Caraballo T, Carvalho AN de, Langa JA. Continuity of Lyapunov functions and of energy level for a generalized gradient semigroup. Topological Methods in Nonlinear Analysis. 2012 ; 39( 1): 57-82.[citado 2025 nov. 18 ]
Artigo de periodico
On convergence and compactness in parabolic problems with globally large diffusion and nonlinear boundary conditions (2012)
Carbinatto, Maria do Carmo ; Rybakowski, Krzysztof P.
Fonte: Topological Methods in Nonlinear Analysis. Unidade: ICMC
Assunto: EQUAÇÕES DIFERENCIAIS PARCIAIS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
CARBINATTO, Maria do Carmo e RYBAKOWSKI, Krzysztof P. On convergence and compactness in parabolic problems with globally large diffusion and nonlinear boundary conditions. Topological Methods in Nonlinear Analysis, v. 40, n. 1, p. 1-28, 2012Tradução . . Acesso em: 18 nov. 2025.
APA
Carbinatto, M. do C., & Rybakowski, K. P. (2012). On convergence and compactness in parabolic problems with globally large diffusion and nonlinear boundary conditions. Topological Methods in Nonlinear Analysis, 40( 1), 1-28.
NLM
Carbinatto M do C, Rybakowski KP. On convergence and compactness in parabolic problems with globally large diffusion and nonlinear boundary conditions. Topological Methods in Nonlinear Analysis. 2012 ; 40( 1): 1-28.[citado 2025 nov. 18 ]
Vancouver
Carbinatto M do C, Rybakowski KP. On convergence and compactness in parabolic problems with globally large diffusion and nonlinear boundary conditions. Topological Methods in Nonlinear Analysis. 2012 ; 40( 1): 1-28.[citado 2025 nov. 18 ]

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