V. Akcelik, G. Biros, and O. Ghattas, Parallel Multiscale Gauss-Newton-Krylov Methods for Inverse Wave Propagation, ACM/IEEE SC 2002 Conference (SC'02), 2002.
DOI : 10.1109/SC.2002.10002

H. B. Ameur, G. Chavent, and J. Jaffré, Refinement and coarsening indicators for adaptive parametrization: application to the estimation of hydraulic transmissivities, Inverse Problems, vol.18, issue.3, pp.775-794, 2002.
DOI : 10.1088/0266-5611/18/3/317

H. B. Ameur, F. Clément, and P. Weis, An ocaml implementation of the refinement indicators algorithm, 2006.

H. B. Ameur, F. Clément, and P. Weis, An optimal control algorithm for image segmentation, 2006.

H. , B. Ameur, and B. Kaltenbacher, Regularization of parameter estimation by adaptive discretization using refinement and coarsening indicators. Inverse and ill posed problems, pp.561-583, 2002.

C. Bunks, F. M. Saleck, S. Zaleski, and G. Chavent, Multiscale seismic waveform inversion, GEOPHYSICS, vol.60, issue.5, pp.1457-1473, 1995.
DOI : 10.1190/1.1443880

C. Chardaire-rivière, G. Chavent, J. Jaffré, and J. Liu, Multiscale representation for simultaneous estimation of relative permeabilities and capillary pressure, paper SPE 20501, 65th Annual Technical Conference and Exhibition of the Society of Petroleum Engineers, pp.303-312, 1990.

E. Chardigny, P. Siegel, R. Mosé, and P. Ackerer, Parameter identification for complex groundwater systems, Computational Methods in Water Resources XI, pp.305-312, 1996.

G. Chavent and R. Bissell, Indicator for the refinement of parametrization, Inverse Problems in Engineering Mechanics (Proceedings of the International Symposium on Inverse Problemsin Engineering Mechanics 1998 (ISIP'98), pp.309-314, 1998.

G. Chavent and J. Liu, MULTISCALE PARAMETRIZATION FOR THE ESTIMATION OF A DIFFUSION COEFFICIENT IN ELLIPTIC AND PARABOLIC PROBLEMS, 5th IFAC Symposium on Control of Distributed Parameter Systems, pp.315-324, 1989.
DOI : 10.1016/B978-0-08-037036-1.50038-0

F. Clément, G. Chavent, and S. Gómez, Migration???based traveltime waveform inversion of 2-D simple structures: A synthetic example, GEOPHYSICS, vol.66, issue.3, pp.845-860, 2001.
DOI : 10.1190/1.1444974

F. Clément, V. Martin, A. Vodicka, R. D. Cosmo, and P. Weis, Domain decomposition and functional programming with OCamlP3l, Proc. of the Internat. Conf. on Computational Methods for Coupled Problems in Science and Engineering. CIMNE, 2005.

F. Clément, V. Martin, A. Vodicka, R. D. Cosmo, and P. Weis, Domain decomposition and skeleton programming with OCamlP3l, Parallel Computing, vol.32, issue.7-8, 2006.
DOI : 10.1016/j.parco.2006.04.003

H. Engl, M. Hanke, and A. Neubauer, Regularization of Inverse Problems, 1996.

J. Liu, A Multiresolution Method for Distributed Parameter Estimation, SIAM Journal on Scientific Computing, vol.14, issue.2, pp.389-405, 1993.
DOI : 10.1137/0914024

J. Liu, A Sensitivity Analysis for Least-Squares Ill-Posed Problems Using the Haar Basis, SIAM Journal on Numerical Analysis, vol.31, issue.5, pp.1486-1496, 1994.
DOI : 10.1137/0731076

T. L. Pratt, J. F. Dolan, J. K. Odum, W. J. Stephenson, R. Williams et al., Multiscale seismic imaging of active fault zones for hazard assesment: A case study of the Santa Monica fault zone, pp.479-489, 1998.