NUMERICAL METHODS FOR THE FRACTIONAL LAPLACIAN: A FINITE DIFFERENCE-QUADRATURE APPROACH

摘要

The fractional Laplacian (-Delta)(alpha/2) is a nonlocal operator which depends on the parameter a and recovers the usual Laplacian as alpha -> 2. A numerical method for the fractional Laplacian is proposed, based on the singular integral representation for the operator. The method combines finite differences with numerical quadrature to obtain a discrete convolution operator with positive weights. The accuracy of the method is shown to be O(h(3-alpha)). Convergence of the method is proven. The treatment of far field boundary conditions using an asymptotic approximation to the integral is used to obtain an accurate method. Numerical experiments on known exact solutions validate the predicted convergence rates. Computational examples include exponentially and algebraically decaying solutions with varying regularity. The generalization to nonlinear equations involving the operator is discussed: the obstacle problem for the fractional Laplacian is computed.