Pseudospectral analysis for multidimensional fractional Burgers equation based on Caputo fractional derivative
DOI10.1007/S40065-024-00465-0zbMATH Open1548.35288MaRDI QIDQ6611210
A. Kumar Mittal, Lokendra K. Balyan, Author name not available (Why is that?)
Publication date: 26 September 2024
Published in: Arabian Journal of Mathematics (Search for Journal in Brave)
Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70) Fractional partial differential equations (35R11) Initial-boundary value problems for nonlinear higher-order PDEs (35G31) Polynomial solutions to PDEs (35C11)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Numerical solution of time fractional Burgers equation by cubic B-spline finite elements
- Parametric spline functions for the solution of the one time fractional Burgers equation
- Fractional Hamiltonian formalism within Caputo's derivative
- The approximate and exact solutions of the space- and time-fractional Burgers equations with initial conditions by variational iteration method
- A survey on semilinear differential equations and inclusions involving Riemann-Liouville fractional derivative
- The fractional calculus. Theory and applications of differentiation and integration to arbitrary order
- Analytical solution for the time fractional BBM-Burger equation by using modified residual power series method
- Mild solutions for class of neutral fractional functional differential equations with not instantaneous impulses
- Fractional Burgers equation with nonlinear non-locality: spectral vanishing viscosity and local discontinuous Galerkin methods
- Solution of two-dimensional time-fractional Burgers equation with high and low Reynolds numbers
- Analysis of a numerical method for the solution of time fractional Burgers equation
- Novel operational matrices-based finite difference/spectral algorithm for a class of time-fractional Burger equation in multidimensions
- An efficient numerical scheme based on Lucas polynomials for the study of multidimensional Burgers-type equations
- A spectral collocation method for solving fractional KdV and KdV-Burgers equations with non-singular kernel derivatives
- A pseudo-spectral method for time distributed order two-sided space fractional differential equations
- A linear finite difference scheme for generalized time fractional Burgers equation
- Numerical solutions of time-fractional coupled viscous Burgers' equations using meshfree spectral method
- Convergence and stability of compact finite difference method for nonlinear time fractional reaction-diffusion equations with delay
- Finite difference/spectral approximations for the time-fractional diffusion equation
- Efficient numerical schemes for the solution of generalized time fractional Burgers type equations
- Non-perturbative analytical solutions of the space- and time-fractional Burgers equations
- Numerical solution of time fractional Burgers equation
- Numerical solutions of time‐fractional Burgers equations
- Spectral Methods for Time-Dependent Problems
- Numerical Algorithms for Time-Fractional Subdiffusion Equation with Second-Order Accuracy
- Spectral Methods in MATLAB
- Numerical and exact solutions for time fractional Burgers' equation
- FINITE DIFFERENCE METHODS FOR FRACTIONAL DIFFERENTIAL EQUATIONS
- An optimal control problem associated to a class of fractional Burgers’ equations
- The Use of Finite Difference/Element Approaches for Solving the Time-Fractional Subdiffusion Equation
- A table of solutions of the one-dimensional Burgers equation
- Pseudospectral analysis and approximation of two‐dimensional fractional cable equation
- A geometrically convergent pseudo-spectral method for multi-dimensional two-sided space fractional partial differential equations
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