Imaging nonlinearity coefficient and sound speed with the JMGT equation in frequency domain

Barbara Kaltenbacher,Imaging nonlinearity coefficient, sound speed with the JMGT equation in frequency domain, arXiv preprint arXiv:2512 · 2025 · arXiv 2512.18431

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Inverse boundary value problems of determining nonlinear coefficients for the JMGT equation

math.AP · 2026-03-15 · unverdicted · novelty 7.0

The Dirichlet-to-Neumann map uniquely determines the nonlinear coefficients β (Westervelt) and (β, κ) (Kuznetsov) in the JMGT equation when observation time exceeds the longest boundary-to-boundary travel time.

Gauge symmetry and uniqueness in inverse problems for the JMGT equation

math.AP · 2026-04-30

On the Jordan-Moore-Gibson-Thompson equation of nonlinear acoustics

math.AP · 2026-04-07

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Inverse boundary value problems of determining nonlinear coefficients for the JMGT equation math.AP · 2026-03-15 · unverdicted · none · ref 19
The Dirichlet-to-Neumann map uniquely determines the nonlinear coefficients β (Westervelt) and (β, κ) (Kuznetsov) in the JMGT equation when observation time exceeds the longest boundary-to-boundary travel time.
Gauge symmetry and uniqueness in inverse problems for the JMGT equation math.AP · 2026-04-30 · unreviewed · ref 16
On the Jordan-Moore-Gibson-Thompson equation of nonlinear acoustics math.AP · 2026-04-07 · unreviewed · ref 5

Imaging nonlinearity coefficient and sound speed with the JMGT equation in frequency domain

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