Stable determination of a simple metric, a covector field and a potential from the hyperbolic Dirichlet-to-Neumann map.arXiv: 1205.6425v1 [math.AP] 29 May 2012

· 2012 · arXiv 1205.6425

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On a stability of time-optimal version of the Boundary Control method

math-ph · 2026-04-03 · unverdicted · novelty 5.0

The map R^{2T} to W^T via C^T factorization is continuous in operator topologies, so R_j^{2T} converging implies the potential q_j converging to q in H^{-2}(Ω^T).

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On a stability of time-optimal version of the Boundary Control method math-ph · 2026-04-03 · unverdicted · none · ref 27
The map R^{2T} to W^T via C^T factorization is continuous in operator topologies, so R_j^{2T} converging implies the potential q_j converging to q in H^{-2}(Ω^T).

Stable determination of a simple metric, a covector field and a potential from the hyperbolic Dirichlet-to-Neumann map.arXiv: 1205.6425v1 [math.AP] 29 May 2012

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