Reconstruction of piecewise smooth wave speeds using multiple scattering
Let $c$ be a piecewise smooth wave speed on $\mathbb R^n$, unknown inside a domain $\Omega$. We are given the solution operator for the scalar wave equation $(\partial_t^2-c^2\Delta)u=0$, but only outside $\Omega$ and only for initial data supported outside $\Omega$. Using our recently developed sca...
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| Zusammenfassung: | Let $c$ be a piecewise smooth wave speed on $\mathbb R^n$, unknown inside a
domain $\Omega$. We are given the solution operator for the scalar wave
equation $(\partial_t^2-c^2\Delta)u=0$, but only outside $\Omega$ and only for
initial data supported outside $\Omega$. Using our recently developed
scattering control method, we prove that piecewise smooth wave speeds are
uniquely determined by this map, and provide a reconstruction formula. In other
words, the wave imaging problem is solvable in the piecewise smooth setting
under mild conditions. We also illustrate a separate method, likewise
constructive, for recovering the locations of interfaces in broken geodesic
normal coordinates using scattering control. |
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| DOI: | 10.48550/arxiv.1801.03144 |