Articles dans des revues avec comité de lecture (44)
  1. 11. Loris, I., & Verhoeven, C. (2012). Iterative algorithms for total variation-like reconstructions in seismic tomography. International Journal on Geomathematics, 3(2), 179-208. doi:10.1007/s13137-012-0036-3
  2. 12. Loris, I., & Verhoeven, C. (2011). On a generalization of the iterative soft-thresholding algorithm for the case of non-separable penalty. Inverse problems, 27(12), 125007. doi:10.1088/0266-5611/27/12/125007
  3. 13. Simons, F., Loris, I., Nolet, G., Daubechies, I., Voronin, S., Judd, J., Vetter, P., Charléty, J., & Vonesch, C. (2011). Solving or resolving global tomographic models with spherical wavelets, and the scale and sparsity of seismic heterogeneity. Geophysical journal international, 187(2), 969-988. doi:10.1111/j.1365-246X.2011.05190.x
  4. 14. Loris, I., Douma, H., Nolet, G., Daubechies, I., & Regone, C. (2010). Nonlinear regularization techniques for seismic tomography. Journal of computational physics, 229(3), 890-905. doi:10.1016/j.jcp.2009.10.020
  5. 15. Brodie, J., Daubechies, I., De Mol, C., Giannone, D., & Loris, I. (2009). Sparse and stable Markowitz portfolios. Proceedings of the National Academy of Sciences of the USA, 106(30), 12267-12272. doi:10.1073/pnas.0904287106
  6. 16. Loris, I. (2009). On the performance of algorithms for the minimization of $ell_1$-penalized functionals. Inverse problems, 25(3), 035008. doi:10.1088/0266-5611/25/3/035008
  7. 17. Loris, I., Bertero, M., De Mol, C., Zanella, R., & Zanni, L. (2009). Accelerating gradient projection methods for l1-constrained signal recovery by steplength selection rules. Applied and computational harmonic analysis, 27(2), 247-254. doi:10.1016/j.acha.2009.02.003
  8. 18. Daubechies, I., Fornasier, M., & Loris, I. (2008). Accelerated projected gradient method for linear inverse problems with sparsity constraints. thejournal of fourier analysis and applications/the, 14(5-6), 764-792. doi:10.1007/s00041-008-9039-8
  9. 19. Loris, I. (2008). L1Packv2: A Mathematica package for minimizing an $ell_1$-penalized functional. Computer physics communications, 179(12), 895-902. doi:10.1016/j.cpc.2008.07.010
  10. 20. Loris, I., Nolet, G., Daubechies, I., & Dahlen, F. (2007). Tomographic inversion using $ell_1$-norm regularization of wavelet coefficients. Geophysical journal international, 170(1), 359-370. doi:10.1111/j.1365-246X.2007.03409.x
  11. 21. Loris, I., & Sasaki, R. (2004). Quantum vs classical mechanics: role of elementary excitations. Physics letters. A, 327(2-3), 152-157. doi:10.1016/j.physleta.2004.05.015
  12. 22. Loris, I., & Sasaki, R. (2004). Quantum and classical eigenfunctions in Calogero and Sutherland systems. Journal of Physics A: Mathematical and General, 37(1), 211-237. doi:10.1088/0305-4470/37/1/015
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