A Numerical Approach of a Time Fractional Reaction–Diffusion Model with a Non-Singular Kernel
Published 2020 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
A Numerical Approach of a Time Fractional Reaction–Diffusion Model with a Non-Singular Kernel
Authors
Keywords
-
Journal
Symmetry-Basel
Volume 12, Issue 10, Pages 1653
Publisher
MDPI AG
Online
2020-10-17
DOI
10.3390/sym12101653
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- An efficient numerical technique for solving time fractional Burgers equation
- (2020) Tayyaba Akram et al. Alexandria Engineering Journal
- Development and analysis of new approximation of extended cubic B-spline to the non-linear time fractional Klein-Gordon equation
- (2020) Tayyaba Akram et al. FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN NATURE AND SOCIETY
- Novel Numerical Approach Based on Modified Extended Cubic B-Spline Functions for Solving Non-Linear Time-Fractional Telegraph Equation
- (2020) Tayyaba Akram et al. Symmetry-Basel
- A computational approach for solving time fractional differential equation via spline functions
- (2020) Nauman Khalid et al. Alexandria Engineering Journal
- Extended cubic B-splines in the numerical solution of time fractional telegraph equation
- (2019) Tayyaba Akram et al. Advances in Difference Equations
- A numerical algorithm based on modified extended B-spline functions for solving time-fractional diffusion wave equation involving reaction and damping terms
- (2019) Nauman Khalid et al. Advances in Difference Equations
- A numerical approach for a class of time-fractional reaction–diffusion equation through exponential B-spline method
- (2019) A. S. V. Ravi Kanth et al. computational and applied mathematics
- A class of efficient difference method for time fractional reaction–diffusion equation
- (2018) Junxia Zhang et al. COMPUTATIONAL & APPLIED MATHEMATICS
- Jacobi collocation scheme for variable-order fractional reaction-subdiffusion equation
- (2018) R. M. Hafez et al. COMPUTATIONAL & APPLIED MATHEMATICS
- A class of efficient difference method for time fractional reaction–diffusion equation
- (2018) Junxia Zhang et al. computational and applied mathematics
- Jacobi collocation scheme for variable-order fractional reaction-subdiffusion equation
- (2018) R. M. Hafez et al. computational and applied mathematics
- Convergence analysis of tau scheme for the fractional reaction-diffusion equation
- (2018) Jalil Rashidinia et al. European Physical Journal Plus
- Numerical solution of the time fractional reaction–diffusion equation with a moving boundary
- (2017) Minling Zheng et al. JOURNAL OF COMPUTATIONAL PHYSICS
- Numerical solution of hyperbolic telegraph equation by cubic B-spline collocation method
- (2016) Shokofeh Sharifi et al. APPLIED MATHEMATICS AND COMPUTATION
- On the new fractional derivative and application to nonlinear Fisher’s reaction–diffusion equation
- (2016) Abdon Atangana APPLIED MATHEMATICS AND COMPUTATION
- Modeling diffusive transport with a fractional derivative without singular kernel
- (2016) J.F. Gómez-Aguilar et al. PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS
- Some new applications for heat and fluid flows via fractional derivatives without singular kernel
- (2016) Xiao-Jun Yang et al. Thermal Science
- An efficient parallel algorithm for Caputo fractional reaction-diffusion equation with implicit finite-difference method
- (2016) Qinglin Wang et al. Advances in Difference Equations
- Modeling of a Mass-Spring-Damper System by Fractional Derivatives with and without a Singular Kernel
- (2015) José Gómez-Aguilar et al. Entropy
- Numerical solutions of the reaction diffusion system by using exponential cubic B-spline collocation algorithms
- (2015) Ozlem Ersoy et al. Open Physics
- Extension of the resistance, inductance, capacitance electrical circuit to fractional derivative without singular kernel
- (2015) Abdon Atangana et al. Advances in Mechanical Engineering
- Solving the Caputo Fractional Reaction-Diffusion Equation on GPU
- (2014) Jie Liu et al. DISCRETE DYNAMICS IN NATURE AND SOCIETY
- A Domain Decomposition Method for Time Fractional Reaction-Diffusion Equation
- (2014) Chunye Gong et al. TheScientificWorldJOURNAL
- On the solutions of time-fractional reaction–diffusion equations
- (2010) S.Z. Rida et al. Communications in Nonlinear Science and Numerical Simulation
Publish scientific posters with Peeref
Peeref publishes scientific posters from all research disciplines. Our Diamond Open Access policy means free access to content and no publication fees for authors.
Learn MoreAdd your recorded webinar
Do you already have a recorded webinar? Grow your audience and get more views by easily listing your recording on Peeref.
Upload Now