Abstract
AbstractWe propose a new monotone finite difference discretization for the variational p-Laplace operator, $$\Delta _pu=\text{ div }(|\nabla u|^{p-2}\nabla u),$$
Δ
p
u
=
div
(
|
∇
u
|
p
-
2
∇
u
)
,
and present a convergent numerical scheme for related Dirichlet problems. The resulting nonlinear system is solved using two different methods: one based on Newton-Raphson and one explicit method. Finally, we exhibit some numerical simulations supporting our theoretical results. To the best of our knowledge, this is the first monotone finite difference discretization of the variational p-Laplacian and also the first time that nonhomogeneous problems for this operator can be treated numerically with a finite difference scheme.
Funder
(MICINN) Spanish Government
Swedish Research Council
Publisher
Springer Science and Business Media LLC
Subject
Computational Theory and Mathematics,General Engineering,Theoretical Computer Science,Software,Applied Mathematics,Computational Mathematics,Numerical Analysis
Reference37 articles.
1. Amghibech, S.: Eigenvalues of the discrete $$p$$-Laplacian for graphs. Ars Combin. 67, 283–302 (2003)
2. Arroyo, A., Llorente, J.G.: On the asymptotic mean value property for planar $$p$$-harmonic functions. Proc. Amer. Math. Soc. 144(9), 3859–3868 (2016)
3. Attouchi, A., Ruosteenoja, E.: Remarks on regularity for $$p$$-Laplacian type equations in non-divergence form. J. Differ. Equ. 265(5), 1922–1961 (2018)
4. Barles, G., Souganidis, P.E.: Convergence of approximation schemes for fully nonlinear second order equations. Asymptotic Anal. 4(3), 271–283 (1991)
5. Barrett, J.W., Liu, W.B.: Finite element approximation of the $$p$$-Laplacian. Math. Comp. 61(204), 523–537 (1993)
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