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Year 2020, , 194 - 213, 31.08.2020
https://doi.org/10.31197/atnaa.770669

Abstract

References

  • Thabet Abdeljawad, On conformable fractional calculus, Journal of Computational and Applied Mathematics 279 (2015), 57–66.
  • Thabet Abdeljawad, Mohammed AL Horani, and Roshdi Khalil, Conformable fractional semigroups of operators, J. Semigroup Theory Appl. 2015 (2015), Article–ID.
  • Thabet Abdeljawad, Qasem M Al-Mdallal, and Fahd Jarad, Fractional logistic models in the frame of fractional operators generated by conformable derivatives, Chaos, Solitons & Fractals 119 (2019), 94–101.
  • Thabet Abdeljawad, Jehad Alzabut, and Fahd Jarad, A generalized lyapunov-type inequality in the frame of conformable derivatives, Advances in Difference Equations 2017 (2017), no. 1,321.
  • Robert A Adams and John JF Fournier, Sobolev spaces, Elsevier, 2003.
  • Abdelilah Lamrani Alaoui and Abderrahmane El Hachimi, Periodic solutions to parabolic equation with singular p-laplacian, Arab J Sci Eng vol. 36 (2011).
  • Herbert Amann, Periodic solutions of semilinear parabolic equations, Nonlinear Analysis vol. 1978 (1978), no. n. 14.
  • Md. Asaduzzaman and Md. Zulfikar Ali, Existence of solution to fractional order impulsive partial hyperbolic differential equations with infinite delay, Advances in the Theory of Nonlinear Analysis and its Application 4 (2020), 77 – 91.
  • Abdon Atangana and Dumitru Baleanu, New fractional derivatives with nonlocal and nonsingular kernel: theory and application to heat transfer model., Thermal Science 20 (2016), no. 2.
  • Vo Van Au, Yong Zhou, Nguyen Can, and Nguyen Tuan, Regularization of a terminal value nonlinear diffusion equation with conformable time derivative, Journal of Integral Equations and Applications 1 (2020), 1–15.
  • Nadia Benkhettou, Salima Hassani, and Delfim FM Torres, A conformable fractional calculus on arbitrary time scales, Journal of King Saud University-Science vol. 28, no. 1 (2016), 9398.
  • Tran Thanh Binh, Nguyen Hoang Luc, Donal ORegan, and Nguyen H Can, On an initial inverse problem for a diffusion equation with a conformable derivative, Advances in Difference Equations 2019 (2019), no. 1, 481.
  • O. Taghipour Bi˙rgani, Sumit Chandok, Nebojsa Dedovi˙c, and Stojan Radenovi˙c, A note on some recent results of the conformable fractional derivative, Advances in the Theory of Nonlinear Analysis and its Application 3 (2019), 11 – 17.
  • Jos´e Luiz Boldrini and Janete Crema, On forced periodic solutions of superlinear quasiparabolic problems, Electronic Journal of Differential Equations vol. 1998 (1998), no. n. 14.
  • Ha¨ım Brezis, Philippe G Ciarlet, and Jacques Louis Lions, Analyse fonctionnelle: th´eorie et applications, vol. 91, Dunod Paris, 1999.
  • Michele Caputo and Mauro Fabrizio, A new definition of fractional derivative without singular kernel, Progr. Fract. Differ. Appl 1 (2015), no. 2, 1–13.
  • Abderrahmane El Hachimi and Abdelilah Lamrani Alaoui, Existence of stable periodic solutions for quasilinear parabolic problems in the presence ofwell ordered lower and upper solutions, Electronic Journal of Differential Equations (, Conference 09, 2002).
  • Maria J Esteban, A remark on the existence of positive periodic solutions of superlinear parabolic problems, Proc. Amer. Math. Soc. 102 (1988), pp. 131136.
  • P HESS, Periodic-parabolic boundary value problem and positivity, Pitman Res. Notes Math Ser. 247, Longman Scientific and Technical, New York, 1991.
  • Daqing Jiang, Juan J Nieto, and Wenjie Zuo, On monotone method for first and second order periodic boundary value problems and periodic solutions of functional differential equations, J. Math. Anal. Appl. vol. 289 (2004.), pp. 691699.
  • Jagan Mohan Jonnalagadda, Existence results for solutions of nabla fractional boundary value problems with general boundary conditions, Advances in the Theory of Nonlinear Analysis and its Application 4 (2020), 29 – 42.
  • Roshdi Khalil, Mohammed Al Horani, Abdelrahman Yousef, and Mohammad Sababheh, A new definition of fractional derivative, Journal of Computational and Applied Mathematics 264 (2014), 65–70.
  • Aziz Khan, Thabet Abdeljawad, J.F. G´omez-Aguilar, and Hasib Khan, Dynamical study of fractional order mutualism parasitism food web module, Chaos, Solitons & Fractals 134 (2020), 109685.
  • Aziz Khan, J.F. G´omez-Aguilar, Thabet Abdeljawad, and Hasib Khan, Stability and numerical simulation of a fractional order plant-nectar-pollinator model, Alexandria Engineering Journal 59 (2020), no. 1, 49–59.
  • Aziz Khan, Muhammed I Syam, Akbar Zada, and Hasib Khan, Stability analysis of nonlinear fractional differential equations with caputo and riemann-liouville derivatives, The European Physical Journal Plus 133 (2018), no. 7, 1–9.
  • Hasib Khan, Wen Chen, Aziz Khan, Tahir S Khan, and Qasem M Al-Madlal, Hyers–ulam stability and existence criteria for coupled fractional differential equations involving p-laplacian operator, Advances in Difference Equations 2018 (2018), no. 1, 455.
  • Hasib Khan, JF Gomez-Aguilar, Thabet Abdeljawad, and Aziz Khan, Existence results and stability criteria for abc-fuzzy-volterra integro-differential equation, Fractals (2020).
  • Hasib Khan, Aziz Khan, Wen Chen, and Kamal Shah, Stability analysis and a numerical scheme for fractional klein-gordon equations, Mathematical Methods in the Applied Sciences 42 (2019), no. 2, 723–732.
  • Anatoli˘ı Aleksandrovich Kilbas, Hari M Srivastava, and Juan J Trujillo, Theory and applications of fractional differential equations, vol. 204, elsevier, 2006.
  • Sachin Kumar, Jos´e Francisco G´omez Aguilar, and Prashant Pandey, Numerical solutions for the reaction–diffusion, diffusion-wave, and cattaneo equations using a new operational matrix for the caputo–fabrizio derivative, Mathematical Methods in the Applied Sciences (2020)
  • Gangaram S Ladde, Vangipuram Lakshmikantham, and Aghalaya S Vatsala, Monotone iterative techniques for nonlinear differential equations, Pitman Advanced Publishing Program, Pitman, London, 1985.
  • Lei Li and Jian-Guo Liu, Some compactness criteria for weak solutions of time fractional pdes, SIAM Journal on Mathematical Analysis 50 (2018), pp. 3963-3995.
  • Jacques Louis Lions, Quelques mthodes de rsolution de problmes aux limites non linaires, Gauthier-Villars, Paris, 1969.
  • Magenes Enrico Lions, Jacques L., Nonhomogeneous boundary values problems and applications, Springer-Verlag, Berlin, New York, 1972.
  • Kenneth S Miller and Bertram Ross, An introduction to the fractional calculus and fractional differential equations, Wiley, 1993.
  • Jia Mu and Hongxia Fan, Positive mild solutions of periodic boundary value problems for fractional evolution equations, Journal of Applied Mathematics Vol.2012 (2012).
  • Jia Mu and Yongxiang Li, Periodic boundary value problems for semilinear fractional differential equations, Mathematical Problems in Engineering Vol.2012 (2011).
  • Subramanian Muthai˙ah, Manigandan Murugesan, and Nandha Gopal Thangaraj, Existence of solutions for nonlocal boundary value problem of hadamard fractional differential equations, Advances in the Theory of Nonlinear Analysis and its Application 3 (2019), 162 – 173.
  • JJ Nieto and Rosana Rodr´ıguez-L´opez, Existence and approximation of solutions for nonlinear functional differential equations with periodic boundary value conditions, J. Comput. Appl. Math. vol. 40 (2000), pp. 433442.
  • Yamina Ouedjedi, Arnaud Rougirel, and Khaled Benmeriem, Galerkin method for time fractional semilinear equations, preprint, May 2019.
  • Igor Podlubny, Fractional differential equations: an introduction to fractional derivatives,fractional differential equations, to methods of their solution and some of their applications,Elsevier, 1998.
  • Michal Posp´ıˇsil and Lucia Posp´ıˇsilova Skripkov´a, ˇ Sturm’s theorems for conformable fractional differential equations, Mathematical Communications 21 (2016), no. 2, 273–281.
  • Roger Temam, Navier-stokes equations: Theory and numerical analysis, vol. 2, Studies in Mathematics and its Applications, North-Holland Publishing Co., Amsterdam-New YorkOxford, 1977.
  • Nguyen Huy Tuan, Le Nhat Huynh, Dumitru Baleanu, and Nguyen Huu Can, On a terminal value problem for a generalization of the fractional diffusion equation with hyper-bessel operator, Mathematical Methods in the Applied Sciences 43 (2020), no. 6, 2858–2882.
  • Nguyen Huy Tuan, Tran Ngoc Thach, Nguyen Huu Can, and Donal O’Regan, Regularization of a multidimensional diffusion equation with conformable time derivative and discrete data, Mathematical Methods in the Applied Sciences (2019).
  • Nguyen Huy Tuan, Yong Zhou, Nguyen Huu Can, et al., Identifying inverse source for fractional diffusion equation with riemann–liouville derivative, Computational and Applied Mathematics 39 (2020), no. 2, 1–16.
  • Yanning Wang, Jianwen Zhou, and Yongkun Li, Fractional sobolev’s spaces on time scales via conformable fractional calculus and their application to a fractional differential equation on time scales, Advances in Mathematical Physics 2016 (2016), 1–22.
  • Wang Yifu, Yin Jingxue, and Wu Zhuoqun, Periodic solutions of evolution p-laplacian equations with nonlinear sources, Journal of Mathematical Analysis and Applications 219 (1998), no. 1, 76–96.
  • Yong Zhou and Li Peng, Weak solutions of the time-fractional navier-stokes equations and optimal control, Computers and Mathematics with Applications vol. 73 (2017.), no. no. 6, pp. 1016-1027.
  • Yong Zhou, JinRong Wang, and Lu Zhang, Basic theory of fractional differential equations, World scientific, 2016.

Monotone Iterative Technique for Nonlinear Periodic Time Fractional Parabolic Problems

Year 2020, , 194 - 213, 31.08.2020
https://doi.org/10.31197/atnaa.770669

Abstract

In this paper, the existence and uniqueness of the weak solution for a linear parabolic equation with conformable derivative are proved, the existence of weak periodic solutions for conformable fractional parabolic nonlinear differential equation is proved by using a more generalized monotone iterative method combined with the method of upper and lower solutions. We prove the monotone sequence converge to weak periodic minimal and maximal solutions. Moreover, the conformable version of the Lions-Magness and Aubin–Lions lemmas are also proved.

References

  • Thabet Abdeljawad, On conformable fractional calculus, Journal of Computational and Applied Mathematics 279 (2015), 57–66.
  • Thabet Abdeljawad, Mohammed AL Horani, and Roshdi Khalil, Conformable fractional semigroups of operators, J. Semigroup Theory Appl. 2015 (2015), Article–ID.
  • Thabet Abdeljawad, Qasem M Al-Mdallal, and Fahd Jarad, Fractional logistic models in the frame of fractional operators generated by conformable derivatives, Chaos, Solitons & Fractals 119 (2019), 94–101.
  • Thabet Abdeljawad, Jehad Alzabut, and Fahd Jarad, A generalized lyapunov-type inequality in the frame of conformable derivatives, Advances in Difference Equations 2017 (2017), no. 1,321.
  • Robert A Adams and John JF Fournier, Sobolev spaces, Elsevier, 2003.
  • Abdelilah Lamrani Alaoui and Abderrahmane El Hachimi, Periodic solutions to parabolic equation with singular p-laplacian, Arab J Sci Eng vol. 36 (2011).
  • Herbert Amann, Periodic solutions of semilinear parabolic equations, Nonlinear Analysis vol. 1978 (1978), no. n. 14.
  • Md. Asaduzzaman and Md. Zulfikar Ali, Existence of solution to fractional order impulsive partial hyperbolic differential equations with infinite delay, Advances in the Theory of Nonlinear Analysis and its Application 4 (2020), 77 – 91.
  • Abdon Atangana and Dumitru Baleanu, New fractional derivatives with nonlocal and nonsingular kernel: theory and application to heat transfer model., Thermal Science 20 (2016), no. 2.
  • Vo Van Au, Yong Zhou, Nguyen Can, and Nguyen Tuan, Regularization of a terminal value nonlinear diffusion equation with conformable time derivative, Journal of Integral Equations and Applications 1 (2020), 1–15.
  • Nadia Benkhettou, Salima Hassani, and Delfim FM Torres, A conformable fractional calculus on arbitrary time scales, Journal of King Saud University-Science vol. 28, no. 1 (2016), 9398.
  • Tran Thanh Binh, Nguyen Hoang Luc, Donal ORegan, and Nguyen H Can, On an initial inverse problem for a diffusion equation with a conformable derivative, Advances in Difference Equations 2019 (2019), no. 1, 481.
  • O. Taghipour Bi˙rgani, Sumit Chandok, Nebojsa Dedovi˙c, and Stojan Radenovi˙c, A note on some recent results of the conformable fractional derivative, Advances in the Theory of Nonlinear Analysis and its Application 3 (2019), 11 – 17.
  • Jos´e Luiz Boldrini and Janete Crema, On forced periodic solutions of superlinear quasiparabolic problems, Electronic Journal of Differential Equations vol. 1998 (1998), no. n. 14.
  • Ha¨ım Brezis, Philippe G Ciarlet, and Jacques Louis Lions, Analyse fonctionnelle: th´eorie et applications, vol. 91, Dunod Paris, 1999.
  • Michele Caputo and Mauro Fabrizio, A new definition of fractional derivative without singular kernel, Progr. Fract. Differ. Appl 1 (2015), no. 2, 1–13.
  • Abderrahmane El Hachimi and Abdelilah Lamrani Alaoui, Existence of stable periodic solutions for quasilinear parabolic problems in the presence ofwell ordered lower and upper solutions, Electronic Journal of Differential Equations (, Conference 09, 2002).
  • Maria J Esteban, A remark on the existence of positive periodic solutions of superlinear parabolic problems, Proc. Amer. Math. Soc. 102 (1988), pp. 131136.
  • P HESS, Periodic-parabolic boundary value problem and positivity, Pitman Res. Notes Math Ser. 247, Longman Scientific and Technical, New York, 1991.
  • Daqing Jiang, Juan J Nieto, and Wenjie Zuo, On monotone method for first and second order periodic boundary value problems and periodic solutions of functional differential equations, J. Math. Anal. Appl. vol. 289 (2004.), pp. 691699.
  • Jagan Mohan Jonnalagadda, Existence results for solutions of nabla fractional boundary value problems with general boundary conditions, Advances in the Theory of Nonlinear Analysis and its Application 4 (2020), 29 – 42.
  • Roshdi Khalil, Mohammed Al Horani, Abdelrahman Yousef, and Mohammad Sababheh, A new definition of fractional derivative, Journal of Computational and Applied Mathematics 264 (2014), 65–70.
  • Aziz Khan, Thabet Abdeljawad, J.F. G´omez-Aguilar, and Hasib Khan, Dynamical study of fractional order mutualism parasitism food web module, Chaos, Solitons & Fractals 134 (2020), 109685.
  • Aziz Khan, J.F. G´omez-Aguilar, Thabet Abdeljawad, and Hasib Khan, Stability and numerical simulation of a fractional order plant-nectar-pollinator model, Alexandria Engineering Journal 59 (2020), no. 1, 49–59.
  • Aziz Khan, Muhammed I Syam, Akbar Zada, and Hasib Khan, Stability analysis of nonlinear fractional differential equations with caputo and riemann-liouville derivatives, The European Physical Journal Plus 133 (2018), no. 7, 1–9.
  • Hasib Khan, Wen Chen, Aziz Khan, Tahir S Khan, and Qasem M Al-Madlal, Hyers–ulam stability and existence criteria for coupled fractional differential equations involving p-laplacian operator, Advances in Difference Equations 2018 (2018), no. 1, 455.
  • Hasib Khan, JF Gomez-Aguilar, Thabet Abdeljawad, and Aziz Khan, Existence results and stability criteria for abc-fuzzy-volterra integro-differential equation, Fractals (2020).
  • Hasib Khan, Aziz Khan, Wen Chen, and Kamal Shah, Stability analysis and a numerical scheme for fractional klein-gordon equations, Mathematical Methods in the Applied Sciences 42 (2019), no. 2, 723–732.
  • Anatoli˘ı Aleksandrovich Kilbas, Hari M Srivastava, and Juan J Trujillo, Theory and applications of fractional differential equations, vol. 204, elsevier, 2006.
  • Sachin Kumar, Jos´e Francisco G´omez Aguilar, and Prashant Pandey, Numerical solutions for the reaction–diffusion, diffusion-wave, and cattaneo equations using a new operational matrix for the caputo–fabrizio derivative, Mathematical Methods in the Applied Sciences (2020)
  • Gangaram S Ladde, Vangipuram Lakshmikantham, and Aghalaya S Vatsala, Monotone iterative techniques for nonlinear differential equations, Pitman Advanced Publishing Program, Pitman, London, 1985.
  • Lei Li and Jian-Guo Liu, Some compactness criteria for weak solutions of time fractional pdes, SIAM Journal on Mathematical Analysis 50 (2018), pp. 3963-3995.
  • Jacques Louis Lions, Quelques mthodes de rsolution de problmes aux limites non linaires, Gauthier-Villars, Paris, 1969.
  • Magenes Enrico Lions, Jacques L., Nonhomogeneous boundary values problems and applications, Springer-Verlag, Berlin, New York, 1972.
  • Kenneth S Miller and Bertram Ross, An introduction to the fractional calculus and fractional differential equations, Wiley, 1993.
  • Jia Mu and Hongxia Fan, Positive mild solutions of periodic boundary value problems for fractional evolution equations, Journal of Applied Mathematics Vol.2012 (2012).
  • Jia Mu and Yongxiang Li, Periodic boundary value problems for semilinear fractional differential equations, Mathematical Problems in Engineering Vol.2012 (2011).
  • Subramanian Muthai˙ah, Manigandan Murugesan, and Nandha Gopal Thangaraj, Existence of solutions for nonlocal boundary value problem of hadamard fractional differential equations, Advances in the Theory of Nonlinear Analysis and its Application 3 (2019), 162 – 173.
  • JJ Nieto and Rosana Rodr´ıguez-L´opez, Existence and approximation of solutions for nonlinear functional differential equations with periodic boundary value conditions, J. Comput. Appl. Math. vol. 40 (2000), pp. 433442.
  • Yamina Ouedjedi, Arnaud Rougirel, and Khaled Benmeriem, Galerkin method for time fractional semilinear equations, preprint, May 2019.
  • Igor Podlubny, Fractional differential equations: an introduction to fractional derivatives,fractional differential equations, to methods of their solution and some of their applications,Elsevier, 1998.
  • Michal Posp´ıˇsil and Lucia Posp´ıˇsilova Skripkov´a, ˇ Sturm’s theorems for conformable fractional differential equations, Mathematical Communications 21 (2016), no. 2, 273–281.
  • Roger Temam, Navier-stokes equations: Theory and numerical analysis, vol. 2, Studies in Mathematics and its Applications, North-Holland Publishing Co., Amsterdam-New YorkOxford, 1977.
  • Nguyen Huy Tuan, Le Nhat Huynh, Dumitru Baleanu, and Nguyen Huu Can, On a terminal value problem for a generalization of the fractional diffusion equation with hyper-bessel operator, Mathematical Methods in the Applied Sciences 43 (2020), no. 6, 2858–2882.
  • Nguyen Huy Tuan, Tran Ngoc Thach, Nguyen Huu Can, and Donal O’Regan, Regularization of a multidimensional diffusion equation with conformable time derivative and discrete data, Mathematical Methods in the Applied Sciences (2019).
  • Nguyen Huy Tuan, Yong Zhou, Nguyen Huu Can, et al., Identifying inverse source for fractional diffusion equation with riemann–liouville derivative, Computational and Applied Mathematics 39 (2020), no. 2, 1–16.
  • Yanning Wang, Jianwen Zhou, and Yongkun Li, Fractional sobolev’s spaces on time scales via conformable fractional calculus and their application to a fractional differential equation on time scales, Advances in Mathematical Physics 2016 (2016), 1–22.
  • Wang Yifu, Yin Jingxue, and Wu Zhuoqun, Periodic solutions of evolution p-laplacian equations with nonlinear sources, Journal of Mathematical Analysis and Applications 219 (1998), no. 1, 76–96.
  • Yong Zhou and Li Peng, Weak solutions of the time-fractional navier-stokes equations and optimal control, Computers and Mathematics with Applications vol. 73 (2017.), no. no. 6, pp. 1016-1027.
  • Yong Zhou, JinRong Wang, and Lu Zhang, Basic theory of fractional differential equations, World scientific, 2016.
There are 50 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Articles
Authors

Abdelilah Lamranı Alaouı

Elhoussine Azroul

Abdelouahed Alla Hamou 0000-0001-7480-0148

Publication Date August 31, 2020
Published in Issue Year 2020

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