# Hyperbolic boundary problems with large oscillatory coefficients:   multiple amplification

**Authors:** Mark Williams

arXiv: 1906.04074 · 2019-06-11

## TL;DR

This paper investigates hyperbolic boundary problems with large oscillatory coefficients, revealing conditions for uniform estimates and demonstrating how such coefficients can cause immediate, multiple amplification of solutions, impacting stability analysis.

## Contribution

It introduces a new approach to prove uniform energy estimates under certain structural conditions and constructs examples showing multiple amplification effects.

## Key findings

- Identified structural conditions for uniform estimates.
- Constructed examples of immediate multiple amplification.
- Showed large oscillatory coefficients can cause infinite order amplification.

## Abstract

We study weakly stable hyperbolic boundary problems with highly oscillatory coefficients that are large, $O(1)$, compared to the small wavelength $\eps$ of oscillations. Such problems arise, for example, in the study of classical questions concerning the stability of Mach stems and compressible vortex sheets. For such applications one seeks to prove energy estimates that are in an appropriate sense "uniform" with respect to the small wavelength $\eps$, but the large oscillatory coefficients are a formidable obstacle to obtaining such estimates. In this paper we analyze a simplified form of the linearized problems that are relevant to the above stability questions, and obtain results that are both positive and negative. On the one hand we identify favorable structural conditions under which it is possible to prove uniform estimates, and then do so by a new approach. We also construct examples showing that large oscillatory coefficients can give rise to an instantaneous \emph{multiple} amplification of the amplitude of solutions relative to data; for example, boundary data of a given amplitude $O(1)$ can \emph{immediately} give rise to a solution of amplitude $O(\frac{1}{\eps^K})$, where $K>1$.\footnote{Examples of first-order amplification, where $K=1$, are well-known \cite{MA,CG}.} We use the examples of multiple amplification to confirm the optimality of our uniform estimates when the favorable structural conditions hold. When those conditions do not hold, we explain how multiple amplification of infinite order may rule out useful estimates.

## Full text

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## References

19 references — full list in the complete paper: https://tomesphere.com/paper/1906.04074/full.md

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Source: https://tomesphere.com/paper/1906.04074