Upwind-and-shifted numerical scheme for fractional convection equation
Abstract
Fundamental solution of a space fractional convection equation of order α is the probability density function of L\'evy flights with long-tailed α-stable jump length distribution. By studying an upwind second-order implicit finite difference scheme for the equation with α∈(0,1), an upwind-and-shifted scheme with order 3-α is obtained in this paper, and the scheme is shown to be unconditionally stable for a wide range of α. Numerical examples, including simulations on a probability density function, are presented showing the effectiveness of the numerical schemes.
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