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A local stabilized approach for approximating the modified time-fractional diffusion problem arising in heat and mass transfer
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Abstract(s)
Introduction: During the last years the modeling of dynamical phenomena has been advanced by including concepts borrowed from fractional order differential equations. The diffusion process plays an important role not only in heat transfer and fluid flow problems, but also in the modelling of pattern formation
that arises in porous media. The modified time-fractional diffusion equation provides a deeper understanding of several dynamic phenomena.
Objectives: The purpose of the paper is to develop an efficient meshless technique for approximating the
modified time-fractional diffusion problem formulated in the Riemann–Liouville sense.
Methods: The temporal discretization is performed by integrating both sides of the modified timefractional diffusion model. The unconditional stability of the time discretization scheme and the optimal convergence rate are obtained. Then, the spatial derivatives are discretized through a local
hybridization of the cubic and Gaussian radial basis function. This hybrid kernel improves the condition of the system matrix. Therefore, the solution of the linear system can be obtained using direct
solvers that reduce significantly computational cost. The main idea of the method is to consider
the distribution of data points over the local support domain where the number of points is almost
constant.
Results: Three examples show that the numerical procedure has good accuracy and applicable over complex domains with various node distributions. Numerical results on regular and irregular domains illustrate the accuracy, efficiency and validity of the technique.
Description
Keywords
Modified time fractional diffusion problem Local hybrid kernel meshless method Finite difference RBF-FD Convergence Stability
Pedagogical Context
Citation
Publisher
Elsevier