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Main Authors: Yi, Yuchao, Zhang, Yang
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.13676
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author Yi, Yuchao
Zhang, Yang
author_facet Yi, Yuchao
Zhang, Yang
contents We consider the restricted Dirichlet-to-Neumann map $Λ^{U,V}_{g,A,q}$ for the wave equation with magnetic potential $A$ and scalar potential $q$, on an admissible Lorentzian manifold $(M, g)$ of dimension $n \geq 3$ with boundary. Here $U$ and $V$ are disjoint open subsets of $\partial M$, where we impose the Dirichlet data on $U$ and measure the Neumann-type data on $V$. We use the gliding rays and microlocal analysis to show that, without any a priori information, one can reconstruct the conformal class of the boundary metric $g|_{T\partial M \times T\partial M}$ and the magnetic potential $A|_{T\partial M}$ at recoverable boundary points from $Λ^{U,V}_{g,A,q}$. In particular, the conformal factor and the jet of the metric at those points are determined up to gauge transformations. Moreover, if the metric and the time orientation are known on $U$ (or $V$), then the metric on a larger portion of $V$ (or $U$) can be reconstructed, up to gauge.
format Preprint
id arxiv_https___arxiv_org_abs_2505_13676
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The Dirichlet-to-Neumann map for Lorentzian Calderón problems with data on disjoint sets
Yi, Yuchao
Zhang, Yang
Analysis of PDEs
We consider the restricted Dirichlet-to-Neumann map $Λ^{U,V}_{g,A,q}$ for the wave equation with magnetic potential $A$ and scalar potential $q$, on an admissible Lorentzian manifold $(M, g)$ of dimension $n \geq 3$ with boundary. Here $U$ and $V$ are disjoint open subsets of $\partial M$, where we impose the Dirichlet data on $U$ and measure the Neumann-type data on $V$. We use the gliding rays and microlocal analysis to show that, without any a priori information, one can reconstruct the conformal class of the boundary metric $g|_{T\partial M \times T\partial M}$ and the magnetic potential $A|_{T\partial M}$ at recoverable boundary points from $Λ^{U,V}_{g,A,q}$. In particular, the conformal factor and the jet of the metric at those points are determined up to gauge transformations. Moreover, if the metric and the time orientation are known on $U$ (or $V$), then the metric on a larger portion of $V$ (or $U$) can be reconstructed, up to gauge.
title The Dirichlet-to-Neumann map for Lorentzian Calderón problems with data on disjoint sets
topic Analysis of PDEs
url https://arxiv.org/abs/2505.13676