Pages that link to "Item:Q2167009"

The following pages link to An accurate approach based on the orthonormal shifted discrete Legendre polynomials for variable-order fractional Sobolev equation (Q2167009):

Displaying 9 items.

• Numerical investigation of the variable-order fractional Sobolev equation with non-singular Mittag-Leffler kernel by finite difference and local discontinuous Galerkin methods (Q2098690) (← links)
• A numerical solution of variable order fractional functional differential equation based on the shifted Legendre polynomials (Q2321020) (← links)
• Orthonormal shifted discrete Legendre polynomials for the variable-order fractional extended Fisher-Kolmogorov equation (Q2675521) (← links)
• Orthonormal discrete Legendre polynomials for nonlinear reaction‐diffusion equations with ABC fractional derivative and non‐local boundary conditions (Q6137320) (← links)
• A mathematical model for precise predicting microbial propagation based on solving variable‐order fractional diffusion equation (Q6139197) (← links)
• Discrete Chebyshev polynomials for the numerical solution of stochastic fractional two-dimensional Sobolev equation (Q6143028) (← links)
• A hybrid approach established upon the Müntz‐Legender functions and 2D Müntz‐Legender wavelets for fractional Sobolev equation (Q6181815) (← links)
• Numerical solution of fractional PDEs through wavelet approach (Q6493923) (← links)
• A numerical method for two-dimensional distributed-order fractional nonlinear Sobolev equation (Q6613316) (← links)