Variational approach for the Kirchhoff problem involving the p-Laplace operator and the ?-Hilfer derivative

Ramzi Alsaedi; Abdeljabbar Ghanmi

doi:10.1002/mma.9053

Back

Variational approach for the Kirchhoff problem involving the p-Laplace operator and the ?-Hilfer derivative

Journal article

Peer reviewed

Variational approach for the Kirchhoff problem involving the p-Laplace operator and the ?-Hilfer derivative

Ramzi Alsaedi and Abdeljabbar Ghanmi

Mathematical methods in the applied sciences

20/01/2023

DOI: https://doi.org/10.1002/mma.9053

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

This work aims to develop the variational framework for some Kirchhoff problems involving both the p-Laplace operator and the Psi-Hilfer derivative. Precisely, we use the mountain pass theorem to prove the existence of nontrivial solutions. Moreover, the multiplicity of solutions is proved by the use of the Z(2)-symmetry mountain pass theorem. Our main results generalize the paper of Torres (J Fract Calculus Appli. 2014;5(1):1-10) and the work of Sousa et al. (Comp Appl Math. 2019;38:4).

Metrics

1 Record Views

Details

Title: Variational approach for the Kirchhoff problem involving the p-Laplace operator and the ?-Hilfer derivative
Creators - without role: Ramzi Alsaedi - King Abdulaziz University
Abdeljabbar Ghanmi - King Abdulaziz University
Publication Details: Mathematical methods in the applied sciences
Publisher: Wiley
Number of pages: 12
Grant note: DSR G: 361-130-1443 / Deanship of Scientific Research (DSR) at King Abdulaziz University, Jeddah, Saudi Arabia
Identifiers: 9939996608331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article