A plane wave is scattered by a potential of bounded support. Translation, rotation and reflection of the potential, q0 induce transformations of the scattered wave. The latter can be represented by means of Born sequences, where q0 appears under the integral sign: non-local formulas are thus derived, the properties of which are discussed. Next, the symmetries induced by the 1 st BORN approximation are addressed. Invariance of the squared modulus of the scattering amplitude holds for translation and reflection. The transformation Tε:= 13 +Σ3ℓ= 1εℓAℓwith {εℓ;} real and {Aℓ} the generators of rotations in IR3, is investigated. Conditions on the {εℓ} are derived, by which the scattering amplitude coming from the first BORN approximation is invariant to Tε. As an application, these "false symmetries" are compared to those induced by limited angular resolution of a detector in light scattering experiments. Namely, scattering patterns are made available by the TAOS (Two-dimensional Angle-resolved Optical Scattering) method, which consists of detecting single airborne aerosol particles and collecting the intensity of the light they scatter from a pulsed, monochromatic laser beam. The optics and the detector properties determine the resolution at which a pattern is saved. The implications on the performance of TAOS pattern analysis are briefly discussed. © 2014 SPIE.

Crosta, G., Videen, G. (2014). True and false symmetries in the classification of optical scatterers. In J.J. Braun (a cura di), Proc. SPIE 9121, Multisensor, Multisource Information Fusion: Architectures, Algorithms, and Applications 2014 (pp. 1-9). Bellingham, WA : SPIE [10.1117/12.2049577].

True and false symmetries in the classification of optical scatterers

CROSTA, GIOVANNI FRANCO FILIPPO;
2014

Abstract

A plane wave is scattered by a potential of bounded support. Translation, rotation and reflection of the potential, q0 induce transformations of the scattered wave. The latter can be represented by means of Born sequences, where q0 appears under the integral sign: non-local formulas are thus derived, the properties of which are discussed. Next, the symmetries induced by the 1 st BORN approximation are addressed. Invariance of the squared modulus of the scattering amplitude holds for translation and reflection. The transformation Tε:= 13 +Σ3ℓ= 1εℓAℓwith {εℓ;} real and {Aℓ} the generators of rotations in IR3, is investigated. Conditions on the {εℓ} are derived, by which the scattering amplitude coming from the first BORN approximation is invariant to Tε. As an application, these "false symmetries" are compared to those induced by limited angular resolution of a detector in light scattering experiments. Namely, scattering patterns are made available by the TAOS (Two-dimensional Angle-resolved Optical Scattering) method, which consists of detecting single airborne aerosol particles and collecting the intensity of the light they scatter from a pulsed, monochromatic laser beam. The optics and the detector properties determine the resolution at which a pattern is saved. The implications on the performance of TAOS pattern analysis are briefly discussed. © 2014 SPIE.
Capitolo o saggio
complex scalar field; Born sequence; rotations; approximation invariants; optical scattering
English
Proc. SPIE 9121, Multisensor, Multisource Information Fusion: Architectures, Algorithms, and Applications 2014
Braun, JJ
2014
9781628410587
9121
SPIE
1
9
91210I
Crosta, G., Videen, G. (2014). True and false symmetries in the classification of optical scatterers. In J.J. Braun (a cura di), Proc. SPIE 9121, Multisensor, Multisource Information Fusion: Architectures, Algorithms, and Applications 2014 (pp. 1-9). Bellingham, WA : SPIE [10.1117/12.2049577].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/52397
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