64 results on '"Gouesbet, Gérard"'
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2. T-matrix methods for electromagnetic structured beams: A commented reference database for the period 2019–2023
3. Dark and superdark theorems with applications to helical beams (beams with a topological charge) which are not vortex beams
4. Symmetries of circularly axisymmetric beams expressed in terms of beam shape coefficients
5. Professor James Albert Lock (1948–2023): A life of honor and work of excellence
6. On evanescent waves and blowing-ups of the finite series technique in spherical wave expansion of shaped beams
7. An approach for a polychromatic generalized Lorenz–Mie theory
8. Blowing-ups of beam shape coefficients of Gaussian beams using finite series in generalized Lorenz–Mie theory
9. A framework for the finite series method of the generalized Lorenz-Mie theory and its application to freely-propagating Laguerre-Gaussian beams
10. Optical forces and optical force partitions exerted on arbitrary sized spherical particles in the framework of generalized Lorenz–Mie theory
11. Ince–Gaussian beams in the generalized Lorenz–Mie theory through finite series Laguerre–Gaussian beam shape coefficients
12. On a class of definite integrals with products of (Ricatti-)Bessel functions and their derivatives
13. Optical forces and optical force categorizations exerted on quadrupoles in the framework of generalized Lorenz–Mie theory
14. On analytical solutions to classes of definite integrals with products of Bessel functions of the first kind and their derivatives
15. Diverging and converging schemes of approximations to describe fundamental EM Gaussian beams beyond the paraxial approximation
16. Towards photophoresis with the generalized Lorenz-Mie theory
17. Interactions between arbitrary electromagnetic shaped beams and circular and elliptical infinite cylinders: A review
18. Angular spectrum representation of the Bessel-Gauss beam and its approximation: A comparison with the localized approximation
19. The generalized Lorenz-Mie theory and its identification with the dipole theory of forces for particles with electric and magnetic properties
20. Optical forces and optical force categorizations on small magnetodielectric particles in the framework of generalized Lorenz-Mie theory
21. Efficient computation of arbitrary beam scattering on a sphere: Comments and rebuttal, with a review on the angular spectrum decomposition
22. Rayleigh limit of generalized Lorenz-Mie theory for on-axis beams and its relationship with the dipole theory of forces. Part II: Non-dark axisymmetric beams of the second kind and dark axisymmetric beams, including a review
23. Poynting vector and beam shape coefficients: On new families of symmetries (non-dark axisymmetric beams of the second kind and dark axisymmetric beams)
24. On the Rayleigh limit of the generalized Lorenz-Mie theory and its formal identification with the dipole theory of forces. II. The transverse case.
25. Rayleigh limit of generalized Lorenz-Mie theory for on-axis beams and its relationship with the dipole theory of forces. Part I: Non dark axisymmetric beams of the first kind, with the example of Gaussian beams
26. On the Rayleigh limit of the generalized Lorenz–Mie theory and its formal identification with the dipole theory of forces. I. The longitudinal case
27. On transverse radiation pressure cross-sections in the generalized Lorenz–Mie theory and their numerical relationship with the dipole theory of forces
28. Finite series algorithm design for lens-focused Laguerre–Gauss beams in the generalized Lorenz–Mie theory
29. Optical forces exerted by on-axis Bessel beams on Rayleigh particles in the framework of generalized Lorenz-Mie theory
30. Axicon optical forces and other kinds of transverse optical forces exerted by off-axis Bessel beams in the Rayleigh regime in the framework of generalized Lorenz-Mie theory
31. Axicon terms associated with gradient optical forces in generalized Lorenz-Mie theory
32. Bessel-Gauss beams in the generalized Lorenz-Mie theory using three remodeling techniques
33. Van de Hulst Essay: A review on generalized Lorenz-Mie theories with wow stories and an epistemological discussion
34. Modified finite series technique for the evaluation of beam shape coefficients in the T-matrix methods for structured beams with application to Bessel beams
35. Gradient, scattering and other kinds of longitudinal optical forces exerted by off-axis Bessel beams in the Rayleigh regime in the framework of generalized Lorenz-Mie theory
36. Finite series expressions to evaluate the beam shape coefficients of a Laguerre-Gauss beam focused by a lens in an on-axis configuration
37. On an infinite number of quadratures to evaluate beam shape coefficients in generalized Lorenz-Mie theory and the extended boundary condition method for structured EM beams
38. Evaluation of beam shape coefficients of paraxial Laguerre–Gauss beam freely propagating by using three remodeling methods
39. T-matrix methods for electromagnetic structured beams: A commented reference database for the period 2014–2018
40. Finite series expressions to evaluate the beam shape coefficients of a Laguerre–Gauss beam freely propagating.
41. Afterword. Laser-light and interactions with particles (LIP), 2018
42. Generalized Lorenz--Mie theories and mechanical effects of laser light, on the occasion of Arthur Ashkin’s receipt of the 2018 Nobel prize in physics for his pioneering work in optical levitation and manipulation: A review
43. Corrigendum to “An approach for a polychromatic generalized Lorenz-Mie theory” [J. Quant. Spectrosc. Radiat. Transfer 312 (2024), 108824]
44. On localized approximations for Laguerre-Gauss beams focused by a lens
45. On the validity of the use of a localized approximation for helical beams. II. Numerical aspects
46. On the validity of the use of a localized approximation for helical beams. I. Formal aspects
47. A darkness theorem for the beam shape coefficients and its relationship to higher-order non-vortex Bessel beams
48. Poynting theorem in terms of beam shape coefficients and applications to axisymmetric, dark and non-dark, vortex and non-vortex, beams
49. On the validity of localized approximation for an on-axis zeroth-order Bessel beam
50. Comments on localized and integral localized approximations in spherical coordinates
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