A simple diffuse interface approach on adaptive Cartesian grids for the linear elastic wave equations with complex topography

TL;DR

This paper introduces a diffuse interface method on adaptive Cartesian grids for simulating seismic wave propagation with complex topography, eliminating the need for mesh generation and accurately capturing free surface boundary conditions.

Contribution

The novel diffuse interface approach simplifies handling complex topography in seismic simulations by avoiding mesh generation and accurately modeling free surface boundary conditions.

Findings

Eigenvalue analysis shows no CFL restriction due to geometry complexity.

The method exactly satisfies free-surface boundary conditions.

High-order DG schemes with AMR improve accuracy and reduce dissipation.

Abstract

In most classical approaches of computational geophysics for seismic wave propagation problems, complex surface topography is either accounted for by boundary-fitted unstructured meshes, or, where possible, by mapping the complex computational domain from physical space to a topologically simple domain in a reference coordinate system. In this paper we propose a completely different strategy. We address the problem of geometrically complex free surface boundary conditions with a novel diffuse interface method on adaptive Cartesian meshes that consists in the introduction of a characteristic function $ 0\leq\alpha\leq 1$ which identifies the location of the solid medium and the surrounding air and thus implicitly defines the location of the free surface boundary. Our new approach completely avoids the problem of mesh generation, since all that is needed for the definition of the complex surface topography is to set a scalar color function to unity inside the regions covered by the solid and to zero outside. An analysis of the eigenvalues of the PDE system shows that the complexity of the geometry has no influence on the admissible time step size due to the CFL condition. The model reduces to the classical linear elasticity equations inside the solid medium where the gradients of $\alpha$ are zero, while in the diffuse interface zone at the free surface boundary the governing PDE system becomes nonlinear. We can prove that the solution of the Riemann problem with arbitrary data and a jump in $\alpha$ from unity to zero yields a Godunov-state at the interface that satisfies the free-surface boundary condition exactly. In order to reduce numerical dissipation, we use high order DG finite element schemes on adaptive AMR grids together with a high resolution shock capturing subcell finite volume (FV) limiter in the diffuse interface region.