Communications publiées lors de congrès ou colloques nationaux et internationaux (11)
  1. 3. Loris, I. (2012). A generalization of the iterative soft-thresholding algorithm for non-separable penalties. In I. Daubechies, G. Kutyniok, H. Rauhut, & T. Strohmer (Eds.), Oberwolfach Reports: Vol. 9 (pp. 1811--1814) European Mathematical Society.
  2. 4. Nassiri, V., & Loris, I. (2012). On log-concavity of skew-symmetric distributions and their applications in penalized linear models. Proceedings of the 43rd Annual Iranian Mathematics Conference (2 ed., pp. 1037-1039) The 43rd Annual Iranian Mathematics Conference(27-30/8/2012: Tabriz, Iran).
  3. 5. Cloquet, C., Loris, I., Verhoeven, C., & Defrise, M. (2012). GISTA reconstructs faster with a restart strategy and even faster with a FISTA-like reconstruction. In 2012 IEEE Nuclear Science Symposium and Medical Imaging Conference (pp. 2334-2338) IEEE. doi:10.1109/NSSMIC.2012.6551530
  4. 6. Simons, F., Loris, I., Brevdo, E., & Daubechies, I. (2011). Wavelets and wavelet-like transforms on the sphere and their application to geophysical data inversion. In Wavelets and Sparsity~XIV: Vol. 8138 (pp. X1-X15) SPIE. doi:10.1117/12.892285
  5. 7. Loris, I. (2000). Recursion operator for a constrained BKP system. In M. Boiti, L. Martina, F. Pempinelli, B. Prinari, & G. Soliani (Eds.), Proceedings of the Workshop on Nonlinearity, Integrability and All That: Twenty Years After NEEDS '79 World Scientific Publishing.
  6. 8. Loris, I., & Willox, R. (1997). Recent results on dimensional reductions of the Kadomtsev-Petviashvili equation. Proceedings of the Fourth National Conference on Theoretical and Applied Mechanics (pp. 27-30).
  7. 9. Willox, R., Loris, I., & Springael, J. (1996). The nlBq-hierarchy as a $pq=C$ reduction of the KP-hierarchy. Proceedings of the Workshop"Non-linear Physics, Theory and Experiment" (pp. 321-329).
  8. 10. Willox, R., & Loris, I. (1996). Symmetry constraints of the KP hierarchy and a nonlocal Boussinesq equation. Symmetry Methods in Physics: VII International Conference. Vol. 2 (pp. 603-609).
  9. 11. Lambert, F., Loris, I., Springael, J., & Willox, R. (1995). A direct bilinearization scheme based on the use of partition polynomials. In Makhankov, A. R. Bishop, & Holm (Eds.), Proceedings of the NEEDS'94 workshop (pp. 102-111) Singapore: World Scientific.
    10.   Rapports de recherche, comptes rendus, lettres à l'éditeur, working papers (3)
  10. 1. Vande Velde, S., Piron, A., Leo, O., & Loris, I. (2024). SmartFACS: a computational deconvolution method for blood and tumor samples in humans and mice.
  11. 2. Loris, I. (2012). Wavelets: A Concise Guide. Amir-Homayoon Najmi. 270 pp. The Johns Hopkins University Press, Baltimore, 2012. Price: $45.00 (paper) ISBN 978-1-4214-0496-6. American journal of physics, 80(12) , 1113. doi:10.1119/1.4742757
  12. 3. Loris, I., & Verhoeven, C. (2010). Practical error estimates for sparse recovery in linear inverse problems.
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