1. Energy dissipation-preserving GSAV-Fourier–Galerkin spectral schemes for space-fractional nonlinear wave equations in multiple dimensions.
- Author
-
Jiang, Huiling and Hu, Dongdong
- Subjects
- *
NONLINEAR wave equations , *FINITE differences , *MATHEMATICAL induction , *ENERGY dissipation - Abstract
In this paper, we utilize the generalized scalar auxiliary variable (GSAV) approach proposed in recent paper [SIAM J. Numer. Anal., 60 (2022), 1905–1931] for space-fractional nonlinear wave equation to construct a novel class of linearly implicit energy dissipation-preserving finite difference/spectral scheme. The unconditional energy dissipation property and unique solvability of the fully discrete scheme are first established. Next, we apply the mathematical induction to discuss the convergence results of the proposed scheme in one- and two-dimensional spaces without the assumption of global Lipschitz condition for the nonlinear term which is necessary for the almost all previous works. Moreover, the convergence of one-dimensional space is unconditional but conditional for two-dimensional space, due to the fractional Sobolev inequalities of one-dimensional space are not equivalent to the high-dimensional versions. Subsequently, the efficient implementations of the proposed schemes are introduced in detail. Finally, extensive numerical comparisons are reported to confirm the effectiveness of the proposed schemes and the correctness of the theoretical analyses. • We reformulate the space-fractional nonlinear wave equation in an equivalent system, and propose a novel class of linearly implicit energy dissipation-preserving finite difference/spectral scheme. • The unconditional convergence of the proposed scheme is discussed based on the assumption of local Lipschitz condition rather than the global Lipschitz condition of the nonlinear term. • We provide ample numerical comparisons between the proposed scheme and the existing schemes to reveal the significance of this paper. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF