A novel local Hermite radial basis function‐based differential quadrature method for solving two‐dimensional variable‐order time fractional advection–diffusion equation with Neumann boundary conditions

Abstract: A novel Hermite radial basis function-based differential quadrature (H-RBF-DQ) method is presented in this paper based on 2D variable order time fractional advection-diffusion equations with Neumann boundary conditions. The proposed method is designed to treat accurately for derivative boundary conditions, which considerably improve the approximation results and extend the range of applicability for the method of RBF-DQ. The advantage of the present method is that the Hermite interpolation coefficients are onl… Show more

The application of upwind meshless approximation finite volume method to the convection dominated problems on the unstructured and deformed meshes

The application of upwind meshless approximation finite volume method to the convection dominated problems on the unstructured and deformed meshes

A robust computational analysis of residual power series involving general transform to solve fractional differential equations