Finite difference schemes for the parabolic p-Laplace equation

Abstract

We propose a new finite difference scheme for the degenerate parabolic equation \[ ∂t u - div(|∇ u|p-2∇ u) =f, p≥ 2. \] Under the assumption that the data is H\"older continuous, we establish the convergence of the explicit-in-time scheme for the Cauchy problem provided a suitable stability type CFL-condition. An important advantage of our approach, is that the CFL-condition makes use of the regularity provided by the scheme to reduce the computational cost. In particular, for Lipschitz data, the CFL-condition is of the same order as for the heat equation and independent of p.

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