Boundary value problem with tempered fractional derivatives and oscillating term
DOI10.1007/s11868-023-00558-yOpenAlexW4387215738MaRDI QIDQ6063488
Jesús Ávalos Rodríguez, César E. Torres Ledesma, Hernán Cuti, Manuel Montalvo Bonilla
Publication date: 7 November 2023
Published in: Journal of Pseudo-Differential Operators and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11868-023-00558-y
variational methodstempered fractional derivativesoscillating termtempered fractional space of Sobolev type
Variational methods involving nonlinear operators (47J30) Boundary eigenvalue problems for ordinary differential equations (34B09) Fractional ordinary differential equations (34A08)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Boundary value problem with fractional \(p\)-Laplacian operator
- Caputo-type modification of the Hadamard fractional derivatives
- Tempered fractional calculus
- Recent history of fractional calculus
- Moments for tempered fractional advection-diffusion equations
- The analysis of fractional differential equations. An application-oriented exposition using differential operators of Caputo type
- On nonlocal fractional Laplacian problems with oscillating potentials
- A general variational principle and some of its applications
- Hilfer-Katugampola fractional derivatives
- A Caputo fractional derivative of a function with respect to another function
- Fractional calculus: quo vadimus? (where are we going?)
- Generalized fractional derivatives and Laplace transform
- Caputo derivatives of fractional variable order: numerical approximations
- Leibniz type rule: \(\psi\)-Hilfer fractional operator
- Fractional Sobolev space with Riemann-Liouville fractional derivative and application to a fractional concave-convex problem
- Variational approach for tempered fractional Sturm-Liouville problem
- \((k, \psi)\)-Hilfer impulsive variational problem
- Transport in the spatially tempered, fractional Fokker–Planck equation
- Applications in Physics, Part B
- Fundamental solution of the tempered fractional diffusion equation
- On Defining The Incomplete Gamma Function
- Variational formulation and efficient implementation for solving the tempered fractional problems
- Fractional Calculus in Medical and Health Science
- A new theory of fractional differential calculus
- Tempered fractional differential equation: variational approach
- The Nehari manifold for aψ-Hilfer fractionalp-Laplacian
- On nonlocal Dirichlet problems with oscillating term
This page was built for publication: Boundary value problem with tempered fractional derivatives and oscillating term
