{"id":328,"date":"2023-05-19T23:58:06","date_gmt":"2023-05-19T23:58:06","guid":{"rendered":"https:\/\/accf2.unitru.edu.pe\/?page_id=328"},"modified":"2023-05-19T23:58:06","modified_gmt":"2023-05-19T23:58:06","slug":"articulos","status":"publish","type":"page","link":"https:\/\/accf.unitru.edu.pe\/index.php\/articulos","title":{"rendered":"Art\u00edculos"},"content":{"rendered":"\n
ART\u00cdCULO<\/td>YEAR<\/td><\/tr>
Lane-Emden equations perturbed by nonhomogeneous potential in the super critical case.Yong Ma, Ying Wang and C\u00e9sar E. Torres Ledesma Adv. Nonlinear Analysis 11, 128-140 (2022).<\/td>2022<\/td><\/tr>
Properties of fractional operators with \ufb01xed memory length.C\u00e9sar E. Torres Ledesma, Josias V. Baca and J. Vanterler da C. Sousa Math Meth Appl Sci. 2021;1-28.<\/td>2021<\/td><\/tr>
Fractional Sobolev space with Riemann?Liouville fractional derivative and application to a fractional concave-convex problem.C\u00e9sar E. Torres Ledesma and Manuel C. Montalvo Bonilla Advances in Operator Theory (2021)6:65.<\/td>2021<\/td><\/tr>
Multiplicity of solutions for a class of fractional elliptic problems with critical exponential growth and nonlocal Neumann condition.Claudianor O. Alves and C\u00e9sar E. Torres Ledesma Communications on Pure and Applied Analysis 20(5) 2065-2100<\/a>.<\/td>2021<\/td><\/tr>
In\ufb01nitely many solutions for a nonlocal type problem with sign-changing weight function.E. Azroul, A. Benkirane, M. Srati and C\u00e9sar E. Torres Ledesma Electronic Journal of Di \ufb00 erential Equations, Vol. 2021, No. 16, pp. 1-15.<\/td>2021<\/td><\/tr>
Ground state solutions for a class of nonlocal regional Schr\u00a8odinger equation with nonperiodic potentials.C\u00e9sar E. Torres Ledesma and Hern\u00b4an C. Guti\u00b4errez Math Meth Appl Sci. 44, 4000-4017<\/a>.<\/td>2021<\/td><\/tr>
Existence of solution for a class of variational inequality in whole R^N with critical growth.Claudianor O. Alves, Luciano M. Barros and C\u00e9sar E. Torres Ledesma Journal of Mathematical Analysis and Applications, 494, 124672<\/td> 2021<\/td><\/tr>
 A variational approach for a problem involving a \u03c8 -Hilfer fractional operator.J. Vanterler da C. Sousa, Leandro S. Tavares and C\u00e9sar E. Torres Ledesma Journal of Appleid Analysis and Computation 11(3), 1610-1630 (2021).<\/td>2021 <\/td><\/tr>
Fractional elliptic problem in exterior domains with nonlocal Neumann condition.Claudianor O. Alves and C\u00e9sar E. Torres Ledesma Nonlinear Analysis, Vol 195, Jun 2020, No 3, 111732<\/td>2020 <\/td><\/tr>
Existence of solutions for a class of fractional elliptic problems on exterior domains.Claudianor O. Alves, Giovanni Molica Bisci and C\u00e9sar E. Torres Ledesma J. Di \ufb00 erential Equations, 268, 7183-7219<\/a><\/td>2020<\/td><\/tr>
Multiplicity of Solutions for a Class of Perturbed Fractional Hamiltonian Systems.C\u00e9sar E. Torres Ledesma and Oliverio Pichardo Bull. Malays. Math. Sci. Soc. 43, 3897-3922<\/a><\/td>2020<\/td><\/tr>
Existence of Heteroclinic Solutions for a Class of Problems Involving the Fractional Laplacian.Claudianor O. Alves, Vincenzo Ambrosio and C\u00e9sar E. Torres Ledesma Analysis and Applications, Vol 17, No 3, 425-451<\/td>2019<\/td><\/tr>
Existence and concentration of solution for a non-local regional Schr\u00f6dinger equation with competing potentials.Claudianor O. Alves and C\u00e9sar E. Torres Ledesma Glasgow Mathematical Journal, Vol 61, No 2, 441-460<\/td>2019<\/td><\/tr>
Fractional Hamiltonian systems with positive semi-de\ufb01nite matrix.C\u00e9sar Torres, Ziheng Zhang and Amado Mendez Journal of Applied Analysis and Computation, Vol 9, No 6, 2436-2453<\/a>.<\/td>2019<\/td><\/tr>
Existence of solution for a general fractional advection-dispersion equation.C\u00e9sar Torres Analysis and Mathematical Physics, Vol 9, No 3, 1303-1318.<\/td>2019<\/td><\/tr>
Liouville-Weyl Fractional Hamiltonian Systems: Existence Result.C\u00e9sar Torres and Wily Zubiaga Progress in Fractional Di \ufb00 erentiation and Applications An International Journal, 5, No. 3, 1-10.<\/td>2019<\/td><\/tr>
Multiplicity of solutions for a class of fractional elliptic problem with critical exponential growth and nonlocal Neumann condition<\/a>
CO Alves, CET LedesmaarXiv preprint arXiv:1910.02422 <\/td>		2019<\/td><\/tr>
Existence of solution for a general fractional advection-dispersion equation<\/a>CE Torres LedesmaAnalysis and Mathematical Physics 9, 1303-1318<\/td>2019<\/td><\/tr>
Existence of solution for a general fractional advection\u2013dispersion equation<\/a>CET LedesmaAnalysis and Mathematical Physics 9 (3), 1303-1318<\/td> 2019<\/td><\/tr>
 Existence of heteroclinic solutions for a class of problems involving the fractional Laplacian<\/a>CO Alves, V Ambrosio, CE Torres LedesmaAnalysis and Applications 17 (03), 425-451<\/td> 2019<\/td><\/tr>
Existence and concentration of solution for a non-local regional Schr\u00f6dinger equation with competing potentials<\/a>CO Alves, CET LedesmaGlasgow Mathematical Journal 61 (2), 441-460<\/td> 2019<\/td><\/tr>
Fractional elliptic problem in exterior domains with nonlocal Neumann boundary condition<\/a>
CO Alves, CET LedesmaarXiv preprint arXiv:1812.04881<\/td>		2018 <\/td><\/tr>
Existence of solutions for a class of fractional elliptic problems on exterior domains<\/a>CO Alves, GM Bisci, CET LedesmaarXiv preprint arXiv:1812.04878<\/td> 2018<\/td><\/tr>
Multiplicity of solutions for a class of nonlocal regional elliptic equations<\/a>C Torres, H Cuti, M Montalvo, O PichardoJournal of Mathematical Analysis and Applications 468 (1), 87-102<\/td> 2018<\/td><\/tr>
Homoclinic Solutions for Fractional Hamiltonian Systems with Indefinite Conditions<\/a>Z Zhang, CET Ledesma, R YuanFilomat 32 (7)<\/td> 2018<\/td><\/tr>
Multiplicity result for non-homogeneous fractional Schrodinger–Kirchhoff-type equations in \u211d n<\/a>
CET LedesmaAdvances in Nonlinear Analysis 7 (3), 247-257<\/td>		2018 <\/td><\/tr>
A Critical Nonlinear Elliptic Equation with Nonlocal Regional Diffusion<\/a>
CET LedesmaTaiwanese Journal of Mathematics 22 (4), 909-930<\/td>		2018 <\/td><\/tr>
Existence and multiplicity of solutions for a non-linear Schr\u00f6dinger equation with non-local regional diffusion<\/a>
CO Alves, CE Torres LedesmaJournal of Mathematical Physics 58 (11), 111507<\/td>		 2017<\/td><\/tr>
Impulsive fractional boundary value problem with p-Laplace operator<\/a>
CET Ledesma, N NyamoradiJournal of Applied Mathematics and Computing 55 (1-2), 257-278<\/td>		2017 <\/td><\/tr>
Existencia de tres soluciones para el sistema hamiltoniano fraccionario<\/a>
CT Ledesma, OP DiestraSelecciones Matem\u00e1ticas 4 (01), 51-58<\/td>		 2017<\/td><\/tr>
Solutions for a class of fractional Hamiltonian systems with a parameter<\/a>
Z Zhang, CET LedesmaJournal of Applied Mathematics and Computing 54 (1-2), 451-468<\/td>		2017 <\/td><\/tr>
Existence and multiplicity result for a fractional p-Laplacian equation with combined fractional derivatives<\/a>C Torres, N NyamoradiarXiv preprint arXiv:1703.02450<\/td>2017 <\/td><\/tr>
Existence and symmetry result for fractional p-Laplacian in<\/a>
E C\u00c9SARCommunications on Pure & Applied Analysis 16 (1), 99-114<\/td>		2017 <\/td><\/tr>
EXISTENCE AND SYMMETRY RESULT FOR FRACTIONAL p-LAPLACIAN IN \u211d n.<\/a>
CE TORRES LEDESMACommunications on Pure & Applied Analysis 16 (1), 99-114<\/td>		2017 <\/td><\/tr>
Concentration of ground state solution for a fractional Hamiltonian Systems<\/a>
CET Ledesma, Z ZhangarXiv preprint arXiv:1610.08286<\/td>		 2016<\/td><\/tr>
Symmetric ground state solution for a non-linear Schr\u00f6dinger equation with non-local regional diffusion<\/a>CE Torres LedesmaComplex Variables and Elliptic equations 61 (10), 1375-1388<\/td> 2016<\/td><\/tr>
Existence of solutions for fractional Hamiltonian systems with nonlinear derivative dependence in R, J<\/a>CT LedesmaFractional Calculus and Applications 7 (2), 74-87<\/td> 2016<\/td><\/tr>
Multiplicity and symmetry results for a nonlinear Schr\u00f6dinger equation with non\u2010local regional diffusion<\/a>CE Torres LedesmaMathematical Methods in the Applied Sciences 39 (11), 2808-2820<\/a><\/td> 2016<\/td><\/tr>
Boundary value problem with fractional p-Laplacian operator<\/a>
C Torres LedesmaAdvances in Nonlinear Analysis 5 (2), 133-146<\/td>		 2016<\/td><\/tr>
Nonlinear Dirichlet problem with non local regional diffusion<\/a>
CET LedesmaFractional Calculus and Applied Analysis 19 (2), 379-393<\/td>		 2016<\/td><\/tr>
Multiplicity result for a stationary fractional reaction-diffusion equations<\/a>
CE Torres LedesmaTbilisi Mathematical Journal 9 (2), 115\u2013127.<\/td>		 2016<\/td><\/tr>
Concentration of ground state solution for a fractional Hamiltonian Systems<\/a>
CETLZ ZhangarXiv preprint arXiv:1610.08286, 25<\/td>		 2016<\/td><\/tr>
Existence and concentration of solutions for a nonlinear fractional Schr\u00f6dinger equations with steep potential well<\/a>C LedesmaCommun. Pure Appl. Anal 15, 535-547<\/td>2016 <\/td><\/tr>
Existence of solution for Liouville-Weyl Fractional Hamiltonian systems<\/a>
CET LedesmaAnnals of the University of Craiova-Mathematics and Computer Science Series \u2026<\/td>		2015<\/td><\/tr>
Existence and symmetric result for Liouville\u2013Weyl fractional nonlinear Schr\u00f6dinger equation<\/a>
CT LedesmaCommunications in Nonlinear Science and Numerical Simulation 27 (1-3), 314-327<\/td>		 2015<\/td><\/tr>
Non-linear Schr\u00f6dinger equation with non-local regional diffusion<\/a>
P Felmer, C TorresCalculus of Variations and Partial Differential Equations 54 (1), 75-98<\/td>		 2015<\/td><\/tr>
Multiplicity of solutions for fractional Hamiltonian systems with Liouville-Weyl fractional derivatives<\/a>
GAM Cruz, CET LedesmaFractional Calculus and Applied Analysis 18 (4), 875-890<\/td>		 2015<\/td><\/tr>
Existence and concentration of solution for a class of fractional Hamiltonian systems with subquadratic potential<\/a>CET LedesmaarXiv:1503.06829<\/td> 2015<\/td><\/tr>
Existence of solution for perturbed fractional Hamiltonian systems<\/a>C TorresarXiv preprint arXiv:1402.6919<\/td> 2014<\/td><\/tr>
Existence of solution for fractional Langevin equation: variational approach<\/a>C TorresElectronic Journal of Qualitative Theory of Differential Equations 2014 (54 \u2026<\/td> 2014<\/td><\/tr>
Existence of a solution for the fractional forced pendulum<\/a>
C TorresJournal of Applied Mathematics and Computational Mechanics 13 (1)<\/td>		 2014<\/td><\/tr>
Mountain pass solution for a fractional boundary value problem<\/a>C TorresJ. Fract. Calc. Appl 5 (1), 1-10<\/td>2014<\/td><\/tr>
RADIAL SYMMETRY OF GROUND STATES FOR A REGIONAL FRACTIONAL NONLINEAR SCHRODINGER EQUATION<\/a>P Felmer, C TorresCommunication on pure and applied analysis 13 (6), 12<\/td> 2014<\/td><\/tr>
Non-homogeneous fractional Schr\\\u00bb odinger equation<\/a>
C TorresarXiv preprint arXiv:1311.0708<\/td>		 2013<\/td><\/tr>
Ground state solution for a class of differential equations with left and right fractional derivatives<\/a>
C TorresarXiv preprint arXiv:1308.4215<\/td>		 2013<\/td><\/tr>
Non linear elliptic equations with non-local regional operators<\/a>
CE Torres LedesmaUniversidad de Chile<\/td>		 2013<\/td><\/tr>
Existence of solution for a class of fractional Hamiltonian systems<\/a>
C TorresarXiv preprint arXiv:1212.5811<\/td>		 2012<\/td><\/tr>
SELECCIONES MATEM\u00c1TICAS<\/a>
CT LEDESMA, OP DIESTRA<\/td>		 <\/td><\/tr>
EXISTENCIA Y UNICIDAD DE LA SOLUCION DE ECUACIONES DIFERENCIALES ORDINARIAS DE ORDEN FRACCIONARIO<\/a>TL C\u00c9SAR<\/td><\/tr><\/tbody><\/table><\/figure>\n","protected":false},"excerpt":{"rendered":"

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