TS018A Wave Propagation and Associated Inverse Problems I
The simulation of wave propagation has been a cornerstone of numerical modeling over the past few decades, owing to its importance in diverse fields such as nondestructive evaluation, medical imaging, seismic exploration, and structural health monitoring. Particular attention has been devoted to the associated inverse problems, which aim to infer information about the propagation medium from its response to prescribed excitations. Despite significant progress in the numerical simulation of forward problems, inverse analyses remain inherently ill-posed, computationally demanding, and highly sensitive to modeling uncertainties. This session aims to bring together researchers engaged in the numerical aspects of wave propagation simulation and its application to inverse wave problems, both contributions centered in advanced inversion/data assimilation strategies or in efficient forward solvers are welcome. Topics of interest include (but are not limited to): - Reliable and efficient forward solvers for elastic, acoustic, or electromagnetic waves. - Bayesian inversion methods. - Adjoint-based sensitivity computations as well as new techniques (e.g., automatic differentiation) to obtain gradient information. - Model reduction techniques and machine-learning surrogates. - Applications to engineering problems, including geophysical problems, non destructive testing or bio-medicine.
Scheduled presentations:
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Recovering inlet flow rate waveform in 1D arterial networks through adjoint-based optimization
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Combining tempering and surrogate modelling in geophysical Bayesian inversions
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Automatic hp-adaptive strategies for the Cartesian grid Discontinuous Galerkin Method solving transient hyperbolic problems
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Layered Railway Track Models: Refuting the Two Commonly Adopted Critical Velocity Paradigms
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A digital twin of ultrasound propagation experiments in polycrystalline specimens: Microstructural Effects