Multicontinuum splitting schemes for multiscale wave problems

TL;DR

This paper introduces multicontinuum splitting schemes for multiscale wave equations with high contrast, enabling efficient and stable numerical solutions by decomposing the solution space and designing tailored time discretizations.

Contribution

It extends multiscale wave problem methods by developing a multicontinuum homogenization approach and contrast-independent stability schemes.

Findings

The proposed schemes accurately capture multiscale wave dynamics.

Stability conditions are contrast-independent with proper continuum selection.

Numerical examples confirm the method's effectiveness and stability.

Abstract

In this work, we propose multicontinuum splitting schemes for the wave equation with a high-contrast coefficient, extending our previous research on multiscale flow problems. The proposed approach consists of two main parts: decomposing the solution space into distinct components, and designing tailored time discretization schemes to enhance computational efficiency. To achieve the decomposition, we employ a multicontinuum homogenization method to introduce physically meaningful macroscopic variables and to separate fast and slow dynamics, effectively isolating contrast effects in high-contrast cases. This decomposition enables the design of schemes where the fast-dynamics (contrast-dependent) component is treated implicitly, while the slow-dynamics (contrast-independent) component is handled explicitly. The idea of discrete energy conservation is applied to derive the stability conditions, which are contrast-independent with appropriately chosen continua. We further discuss strategies for optimizing the space decomposition. These include a Rayleigh quotient problem involving tensors, and an alternative generalized eigenvalue decomposition to reduce computational effort. Finally, various numerical examples are presented to validate the accuracy and stability of our proposed method.