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Nonlinear Problem Involving the Fractional P(x)-Laplacian Operator by Topological Degree

Автор(ы):

Ait Hammou Mustapha

Doctor of Applied Mathematics, Professor in the Department of Mathematics, Laboratory of Mathematical Analysis and Applications, Faculty of Sciences Dhar El Mahraz, Sidi Mohamed Ben Abdellah University, Fez, Morocco.

mustapha.aithammou@usmba.ac.ma

Аннотация:

This paper is concerned with the study of a nonlinear problem involving the fractional p(x)-Laplacian operator. By means of the Berkovits degree theory, we prove the existence of nontrivial weak solutions for this problem. The appropriate functional framework for this problem is the fractional Sobolev spaces with variable exponent.

Ключевые слова

• Degree theory
• fractional p(x)-Laplacian operator
• fractional Sobolev spaces with variable exponent
• Nonlinear elliptic problem

Ссылки:

1. Alsaedi R. Perturbed subcritical Dirichlet problems with variable exponents. Electron. J. Differential Equations, 2016, 295, 1-12
2. Applebaum D. Levy processes and stochastic calculus, Second edition. Cambridge Studies in Advanced Mathematics, Vol. 116, Cambridge University Press, Cambridge, 2009
3. Azroul E., Benkirane A., Shimi M. Eigenvalue problems involving the fractional p(x)-Laplacian operator. Adv. Oper. Theory, 2019, 4 (2), 539-555
4. Bahrouni A., Ho K. Y. Remarks on eigenvalue problems for fractional p(·)-Laplacian. Asymptot. Anal., 2021, 123 (1-2), 139-156
5. Bahrouni A., Radulescu V. On a new fractional Sobolev space and applications to nonlocal variational problems with variable exponent. Discrete Contin. Dyn. Syst., 2018, 11, 379-389
6. Berkovits J. Extension of the Leray-Schauder degree for abstract Hammerstein type mappings. J. Differential Equations, 2007, 234, 289-310
7. Bisci G. M., Radulescu V., Servadi R. Variational methods for nonlocal fractional problems, With a foreword by Jean Mawhin. Encyclopedia of Mathematics and its Applications, Vol. 162, Cambridge University Press, Cambridge, 2016
8. Bucur C., Valdinoci E. Nonlocal diffusion and applications. Lecture Notes of the Unione Matematica Italiana, Vol. 20, Springer, [Cham], Unione Matematica Italiana, Bologna, 2016
9. Caffarelli L. Nonlocal diffusions, drifts and games. Nonlinear partial differential equations, Abel Symp., Vol. 7: 37{52, Springer, Heidelberg, 2012
10. Chen Y., Levine S., Rao M. Variable exponent, linear growth functionals in image processing. SIAM J. Appl. Math., 2006, 66, 1383-1406
11. Fan X. L., Zhao D. On the Spaces L^(p(x))(Omega) and W^(m,p(x)). J. Math. Anal. Appl., 2001, 263, 424-446
12. Ho K., Kim Y. H. A-priori bounds and multiplicity of solutions for nonlinear elliptic problems involving the fractional p(·)-Laplacian. Nonlinear Anal., 2019, 188, 179-201
13. Ho K., Kim Y. H. The concentration-compactness principles for W^(s,p(.,.))(R^N) and application. Adv. Nonlinear Anal., 2021, 10, 816-848
14. Kaufmann U., Rossi J. D., Vidal R. Fractional Sobolev spaces with variable exponents and fractional p(x)− Laplacians. Electron. J. Qual. Theory Differ. Equ., 2017, 76, 1-10
15. Kim I. S., Hong, S. J. A topological degree for operators of generalized (S+) type. Fixed Point Theory and Appl., 2015, 2015:194
16. Kovacik O., Rakosnik J. On spaces L^(p(x)) and W^(1,p(x)). Czechoslovak Math. J., 1991, 41, 592-618
17. Zeidler E. Nonlinear Functional Analysis and its Applications. II/B: Nonlinear monotone Operators, Springer, New York, 1990
18. Zhang C., Zhang X. Renormalized solutions for the fractional p(x)-Laplacian equation with L1 data. Nonlinear Anal., 2020, 190, 111610
19. Zhao D., Qiang W. J., Fan X. L. On generalized Orlicz spaces L^(p(x))(Omega). J. Gansu Sci., 1996, 9 (2), 1-7

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