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IMPLICIT DIFFERENCE APPROXIMATION FOR A TIME FRACTIONAL ADVECTION-DISPERSION EQUATION
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作者 Chen Chunhua Lu Xuanzhu Liu Fawang 《Annals of Differential Equations》 2005年第3期250-255,共6页
In this paper, a time fractional advection-dispersion equation is considered. From the relationship between the Caputo derivative and the Griinwald derivative, the Caputo derivative is approximated by using the Griinw... In this paper, a time fractional advection-dispersion equation is considered. From the relationship between the Caputo derivative and the Griinwald derivative, the Caputo derivative is approximated by using the Griinwald derivative. An implicit difference approximation for this equation is proposed. We prove that this approximation is unconditionally stable and convergent. Finally, numerical examples are given. 展开更多
关键词 time fractional advection-dispersion equation implicit difference approximation STABILITY CONVERGENCE
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NUMERICAL SOLUTION OF THE SPACE FRACTIONAL DIFFERENTIAL EQUATION 被引量:1
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作者 Zheng Dayi Lu Xuanzhu Liu Fawang 《Annals of Differential Equations》 2005年第3期518-524,共7页
In this paper, a space fractional differential equation is considered. The equation is obtained from the parabolic equation containing advection, diffusion and reaction terms by replacing the second order derivative i... In this paper, a space fractional differential equation is considered. The equation is obtained from the parabolic equation containing advection, diffusion and reaction terms by replacing the second order derivative in space by a fractional derivative in space of order. An implicit finite difference approximation for this equation is presented. The stability and convergence of the finite difference approximation are proved. A fractional-order method of lines is also presented. Finally, some numerical results are given. 展开更多
关键词 space fractional differential equation implicit finite difference approximation STABILITY CONVERGENCE
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