MS 04: Tomographic Reconstruction of Discontinuous Coefficients
Mon, 27 March, 2017, 16:30–18:30, Room: UC 202DH
Organizer
Elena Beretta
Abstract
Several methods have been proposed to reconstruct discontinuous coefficient in partial differential equations. Among these methods there are shape optimization techniques, sampling methods, topological gradient methods. In this minisymposium we consider aspects of convergence and stability of the parameter identification problem, as well as the convergence and stability of the reconstruction algorithm. This minisymposium aims at providing an interdisciplinary forum for experts in these fields.
List of speakers
Elisa Francini Differentiability of the Dirichlet to Neumann map under movements of polygonal inclusions |
Luca Rondi Regularisation and discretisation for the Calderón problem |
Giovanni Alberti Disjoint sparsity for signal separation and applications to quantitative photoacoustic tomography |
Andrea Manzoni Numerical approximation of Bayesian Inverse Problems for PDEs by Reduced-Order Modeling techniques |
Andrea Aspri A linear elastic model to detect magma chamber |
Luca Ratti An inverse problem related to a nonlinear parabolic equation arising in electrophysiology of the heart |