Research Projects

Whether as coodinators or as collaborators, AEG members are currently involved with three research projects: FAPESP (2015/26444-8 and 2017/10445-0), CNPq (426990/2018-8).

Just as electrons in a harmonic EM field, opportunities come and go. Undergraduate and graduate students interested in our main areas of research may find hot-topic opportunities here in our group. Remember you are in one of the most (if not the most!) recognized Brazilian universities worldwide. Catch up with the opportunities to improve your academic skills with us.

List of Recent Publications

Here is a list of ten most recent journal publications. For a full list of publications including journal papers, book chapters, abstracts and papers in conferences and so on, check here.

  1. L. A. Ambrosio, "Circularly symmetric frozen waves: Vector approach for light scattering calculations," J. Quant. Spectrosc. Rad. Transfer 204, 112-119 (2018). (Link)

  2. A. Chefiq, L. A. Ambrosio, G. Gouesbet, e L. Belafhal, "On the validity of integral localized approximation for on-axis zeroth-order Mathieu beams," J. Quant. Spectrosc. Rad. Transfer 204, 27-34 (2018). (Link)

  3. G. Gouesbet, e L. A. Ambrosio, "On the validity of the use of a localized approximation for helical beams. I. Formal aspects," J. Quant. Spectrosc. Rad. Transfer 208, 12-18 (2018). (Link)

  4. L. A. Ambrosio, e G. Gouesbet, "On the validity of the use of a localized approximation for helical beams. II. Numerical aspects," J. Quant. Spectrosc. Rad. Transfer 215, 41-50 (2018). (Link)

  5. G. Gouesbet, e L. A. Ambrosio, "On localized approximations for Laguerre-Gauss beams focused by a lens," J. Quant. Spectrosc. Rad. Transfer 218, 100-114 (2018). (Link)

  6. L. A. Ambrosio, M. Zamboni-Rached, e G. Gouesbet, "Discrete vector frozen waves in generalized Lorenz-Mie theory: linear, azimuthal and radial polarizations," Appl. Opt. 57, 3293-3300 (2018). (Link)

  7. L. A. Ambrosio, L. F. M. Votto, G. Gouesbet, e J. J. Wang, "Assessing the validity of the localized approximation for discrete superpositions of Bessel beams," J. Opt. Soc. Am. B 35, 2690-2698 (2018). (Link)

  8. L. A. Ambrosio, M. Zamboni-Rached, e G. Gouesbet, "Zeroth-order continuous vector frozen waves for light scattering: exact multipole expansion in the generalized Lorenz-Mie theory," J. Opt. Soc. Am. B 36, 81-89 (2019). (Link)

  9. G. Gouesbet, L. A. Ambrosio, e L. F. M. Votto, "Finite series expressions to evaluate the beam shape coefficients of a Laguerre-Gauss beam freely propagating," J. Quant. Spectrosc. Rad. Transfer 227, 12-19 (2019). (Link)

  10. L. A. Ambrosio, "Millimeter-Structured Nondiffracting Surface Beams," J. Opt. Soc. Am. B 36, 638-645 (2019). (Link)

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