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Artigo de periodico
Fractional mathematical oncology: on the potential of non-integer order calculus applied to interdisciplinary models (2021)
Valentim Junior, Carlos Alberto; Rabi, José Antonio ; David, Sérgio Adriani
Source: BioSystems. Unidade: FZEA
Subjects: ONCOLOGIA, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, NEOPLASIAS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
VALENTIM JUNIOR, Carlos Alberto e RABI, José Antonio e DAVID, Sérgio Adriani. Fractional mathematical oncology: on the potential of non-integer order calculus applied to interdisciplinary models. BioSystems, v. 204, p. 1-10, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.biosystems.2021.104377. Acesso em: 05 dez. 2025.
APA
Valentim Junior, C. A., Rabi, J. A., & David, S. A. (2021). Fractional mathematical oncology: on the potential of non-integer order calculus applied to interdisciplinary models. BioSystems, 204, 1-10. doi:10.1016/j.biosystems.2021.104377
NLM
Valentim Junior CA, Rabi JA, David SA. Fractional mathematical oncology: on the potential of non-integer order calculus applied to interdisciplinary models [Internet]. BioSystems. 2021 ; 204 1-10.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.biosystems.2021.104377
Vancouver
Valentim Junior CA, Rabi JA, David SA. Fractional mathematical oncology: on the potential of non-integer order calculus applied to interdisciplinary models [Internet]. BioSystems. 2021 ; 204 1-10.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.biosystems.2021.104377
Artigo de periodico
On multistep tumor growth models of fractional variable-order (2021)
Valentim Junior, Carlos Alberto; Rabi, José Antonio ; David, Sérgio Adriani ; Machado, José António Tenreiro
Source: BioSystems. Unidade: FZEA
Subjects: ONCOLOGIA, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, NEOPLASIAS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
VALENTIM JUNIOR, Carlos Alberto et al. On multistep tumor growth models of fractional variable-order. BioSystems, v. 199, n. Ja 2021, p. 1-12, 2021Tradução . . Disponível em: https://doi.org/10.1016/j.biosystems.2020.104294. Acesso em: 05 dez. 2025.
APA
Valentim Junior, C. A., Rabi, J. A., David, S. A., & Machado, J. A. T. (2021). On multistep tumor growth models of fractional variable-order. BioSystems, 199( Ja 2021), 1-12. doi:10.1016/j.biosystems.2020.104294
NLM
Valentim Junior CA, Rabi JA, David SA, Machado JAT. On multistep tumor growth models of fractional variable-order [Internet]. BioSystems. 2021 ; 199( Ja 2021): 1-12.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.biosystems.2020.104294
Vancouver
Valentim Junior CA, Rabi JA, David SA, Machado JAT. On multistep tumor growth models of fractional variable-order [Internet]. BioSystems. 2021 ; 199( Ja 2021): 1-12.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.biosystems.2020.104294
Artigo de periodico
On the stability of stationary solutions in diffusion models of oncological processes (2021)
Debbouche, Amar ; Polovinkina, Marina V. ; Polovinkin, Igor P. ; Valentim Junior, Carlos Alberto; David, Sérgio Adriani
Source: European Physical Journal Plus. Unidade: FZEA
Subjects: ONCOLOGIA, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, NEOPLASIAS
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
DEBBOUCHE, Amar et al. On the stability of stationary solutions in diffusion models of oncological processes. European Physical Journal Plus, v. 136, n. Ja 2021, p. 1-18, 2021Tradução . . Disponível em: https://doi.org/10.1140/epjp/s13360-020-01070-8. Acesso em: 05 dez. 2025.
APA
Debbouche, A., Polovinkina, M. V., Polovinkin, I. P., Valentim Junior, C. A., & David, S. A. (2021). On the stability of stationary solutions in diffusion models of oncological processes. European Physical Journal Plus, 136( Ja 2021), 1-18. doi:10.1140/epjp/s13360-020-01070-8
NLM
Debbouche A, Polovinkina MV, Polovinkin IP, Valentim Junior CA, David SA. On the stability of stationary solutions in diffusion models of oncological processes [Internet]. European Physical Journal Plus. 2021 ; 136( Ja 2021): 1-18.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1140/epjp/s13360-020-01070-8
Vancouver
Debbouche A, Polovinkina MV, Polovinkin IP, Valentim Junior CA, David SA. On the stability of stationary solutions in diffusion models of oncological processes [Internet]. European Physical Journal Plus. 2021 ; 136( Ja 2021): 1-18.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1140/epjp/s13360-020-01070-8
Artigo de periodico
Sliding mode control in a mathematical model to chemoimmunotherapy: the occurrence of typical singularities (2020)
Rodrigues, Diego S.; Mancera, Paulo F. A.; Carvalho, Tiago de ; Gonçalves, Luiz Fernando
Source: Applied Mathematics and Computation. Unidade: FFCLRP
Subjects: MODELOS MATEMÁTICOS, NEOPLASIAS, ONCOLOGIA, EQUAÇÕES DIFERENCIAIS ORDINÁRIAS, MATEMÁTICA APLICADA
A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas
ABNT
RODRIGUES, Diego S. et al. Sliding mode control in a mathematical model to chemoimmunotherapy: the occurrence of typical singularities. Applied Mathematics and Computation, v. 387, p. 1-19, 2020Tradução . . Disponível em: https://doi.org/10.1016/j.amc.2019.124782. Acesso em: 05 dez. 2025.
APA
Rodrigues, D. S., Mancera, P. F. A., Carvalho, T. de, & Gonçalves, L. F. (2020). Sliding mode control in a mathematical model to chemoimmunotherapy: the occurrence of typical singularities. Applied Mathematics and Computation, 387, 1-19. doi:10.1016/j.amc.2019.124782
NLM
Rodrigues DS, Mancera PFA, Carvalho T de, Gonçalves LF. Sliding mode control in a mathematical model to chemoimmunotherapy: the occurrence of typical singularities [Internet]. Applied Mathematics and Computation. 2020 ; 387 1-19.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.amc.2019.124782
Vancouver
Rodrigues DS, Mancera PFA, Carvalho T de, Gonçalves LF. Sliding mode control in a mathematical model to chemoimmunotherapy: the occurrence of typical singularities [Internet]. Applied Mathematics and Computation. 2020 ; 387 1-19.[citado 2025 dez. 05 ] Available from: https://doi.org/10.1016/j.amc.2019.124782

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