Inverse problems for nonlinear hyperbolic equations with disjoint sources and receivers

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2020-06-22 DOI:10.1017/fmp.2021.11
A. Feizmohammadi, M. Lassas, L. Oksanen
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引用次数: 10

Abstract

Abstract The article studies inverse problems of determining unknown coefficients in various semi-linear and quasi-linear wave equations given the knowledge of an associated source-to-solution map. We introduce a method to solve inverse problems for nonlinear equations using interaction of three waves that makes it possible to study the inverse problem in all globally hyperbolic spacetimes of the dimension $n+1\geqslant 3$ and with partial data. We consider the case when the set $\Omega _{\mathrm{in}}$ , where the sources are supported, and the set $\Omega _{\mathrm{out}}$ , where the observations are made, are separated. As model problems we study both a quasi-linear equation and a semi-linear wave equation and show in each case that it is possible to uniquely recover the background metric up to the natural obstructions for uniqueness that is governed by finite speed of propagation for the wave equation and a gauge corresponding to change of coordinates. The proof consists of two independent components. In the geometric part of the article we introduce a novel geometrical object, the three-to-one scattering relation. We show that this relation determines uniquely the topological, differential and conformal structures of the Lorentzian manifold in a causal diamond set that is the intersection of the future of the point $p_{in}\in \Omega _{\mathrm{in}}$ and the past of the point $p_{out}\in \Omega _{\mathrm{out}}$ . In the analytic part of the article we study multiple-fold linearisation of the nonlinear wave equation using Gaussian beams. We show that the source-to-solution map, corresponding to sources in $\Omega _{\mathrm{in}}$ and observations in $\Omega _{\mathrm{out}}$ , determines the three-to-one scattering relation. The methods developed in the article do not require any assumptions on the conjugate or cut points.
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具有不相交源和接收器的非线性双曲型方程的反问题
摘要本文研究了在已知相关源到解映射的情况下,确定各种半线性和拟线性波动方程中未知系数的反问题。我们介绍了一种利用三波相互作用求解非线性方程反问题的方法,这使得研究所有维度为$n+1\geqslant 3$的全局双曲时空和部分数据的反问题成为可能。我们考虑这样的情况,即支持源的集合$\Omega_{\mathrm{in}}$和进行观测的集合$\ Omega_。作为模型问题,我们研究了拟线性方程和半线性波动方程,并表明在每种情况下,都有可能唯一地恢复背景度量,直到自然障碍物的唯一性,该唯一性由波动方程的有限传播速度和对应于坐标变化的规范控制。证据由两个独立的部分组成。在本文的几何部分,我们介绍了一种新的几何对象,即三对一散射关系。我们证明了这种关系唯一地确定了因果菱形集中洛伦兹流形的拓扑、微分和共形结构,该因果菱形集是点$p_。在本文的分析部分,我们研究了使用高斯光束的非线性波动方程的多重线性化。我们证明了源到解的映射,对应于$\Omega_{\mathrm{in}}$中的源和$\Omega _{\ mathrm{out}}$中的观测,确定了三对一散射关系。本文中开发的方法不需要对共轭点或切割点进行任何假设。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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