Well-Balanced Second-Order Convex Limiting Technique for Solving the Serre–Green–Naghdi Equations
Document Type
Article
Publication Date
11-1-2022
Abstract
In this paper, we introduce a numerical method for approximating the dispersive Serre–Green–Naghdi equations with topography using continuous finite elements. The method is an extension of the hyperbolic relaxation technique introduced in Guermond et al. (J Comput Phys 450:110809, 2022). It is explicit, second-order accurate in space, third-order accurate in time, and is invariant-domain preserving. It is also well balanced and parameter free. Special attention is given to the convex limiting technique when physical source terms are added in the equations. The method is verified with academic benchmarks and validated by comparison with laboratory experimental data.
Publication Source (Journal or Book title)
Water Waves
First Page
409
Last Page
445
Recommended Citation
Guermond, J., Kees, C., Popov, B., & Tovar, E. (2022). Well-Balanced Second-Order Convex Limiting Technique for Solving the Serre–Green–Naghdi Equations. Water Waves, 4 (3), 409-445. https://doi.org/10.1007/s42286-022-00062-8