Geometric Polarimetry—Part I: Spinors and Wave States

Bebbington, D.H.O.; Carrea, Laura

doi:10.1109/tgrs.2013.2278141

Cited by 3 publications

(28 citation statements)

References 49 publications

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“…It might be said that is where problems began to arise in polarimetry because the two concepts are not formally consistent: Jones vectors effectively acquired a dual identity as both vectors and spinors, which are the carriers of the special unitary group, SU(2). In [21] this problem was resolved by identifying the descriptors that transform unitarily, and properly, as spinors, while Jones vectors remain properly as complex vectors. For any fixed wave propagation direction there is a 1:1 mapping between the two, which in some cases appears numerically trivial, but is inherently non-trivial, since spinors correspond geometrically to the complex generators of the Poincaré sphere, rather than to vectors.…”

Section: Spinorsmentioning

confidence: 99%

“…Monostatic scattering, which involves greater symmetries, has yet further interesting features that can be revealed using geometric methods that space does not permit to be presented in the present paper. In the first paper [21] of the projected formal series on Geometric Polarimetry we undertook the most detailed investigation to date into how spinor algebra can be used in a rigorous way to represent electromagnetic polarization. This paper is a direct continuation, and the reader will be referred back to it for many of the fundamental developments that will be required here.…”

Section: Introductionmentioning

confidence: 99%

“…This paper is a direct continuation, and the reader will be referred back to it for many of the fundamental developments that will be required here. The most significant features to emerge in [21] were that spinors should be considered to represent complex coherent wave states geometrically not as vectors in the tradition of Jones vectors [22] but rather as generating lines on the Poincaré sphere via a direct construction in complex projective space. As we progress through the foundations of polarimetry it will become increasingly clearer that this concept underpins the inherent geometric connection between all polarimetric descriptors.…”

Section: Introductionmentioning

confidence: 99%

“…Whilst in [25] we deduced the spinor character of the antenna height as contravariant, space did not permit an explicit derivation. In [21] we concentrated exclusively on representations of wave state. Given that it has now been shown that wave states have covariant spinor representations, we are now in a position to give a similar derivation from first principles of the antenna height spinor.…”

Section: Introductionmentioning

confidence: 99%

“…The plan of the remainder of the paper is as follows. In section IV we develop a rigorous derivation of antenna height spinors using results from [21] and applying Schelkunoff's reaction theorem [31], [32]. In section VI, we develop the geometrical properties of the scattering matrix, seen as a bilinear form as in (1), while we devote section VIII to a modified definition of the Huynen polarization fork for the general bistatic case.…”

Section: Introductionmentioning

confidence: 99%

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Geometric Polarimetry—Part II: The Antenna Height Spinor and the Bistatic Scattering Matrix

Bebbington

Carrea

2017

IEEE Trans. Geosci. Remote Sensing

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Abstract-This paper completes the fundamental development of the basic coherent entities in Radar Polarimetry for coherent reciprocal scattering involving polarized wave states, antenna states and scattering matrices. The concept of antenna polarization states as contravariant spinors is validated from fundamental principles in terms of Schelkunoff's reaction theorem and the Lorentz reciprocity theorem. In the general bistatic case polarization states of different wavevectors must be related by the linear scattering matrix. It is shown that the relationship can be expressed geometrically, and that each scattering matrix has a unique complex scalar invariant characterising a homographic mapping relating pairs of transmit/receive states for which the scattering amplitude vanishes. We show how the scalar invariant is related to the properties of the bistatic Huynen fork in both its conventional form and according to a new definition. Results are presented illustrating the invariant k for a range of spheroidal Rayleigh scatterers.

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Section: Spinorsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 3 more Smart Citations

Geometric Polarimetry—Part II: The Antenna Height Spinor and the Bistatic Scattering Matrix

Bebbington

Carrea

2017

IEEE Trans. Geosci. Remote Sensing

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Eigenvalue Signal Processing for Weather Radar Polarimetry: Removing the Bias Induced by Antenna Coherent Cross-Channel Coupling

Galletti

Zrnić

Gekat³

et al. 2014

IEEE Trans. Geosci. Remote Sensing

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We present a novel digital signal processing procedure, named eigenvalue signal pocessing (henceforth ESP), patented by the first author with Brookhaven Science Associates in 2013. The method enables the removal of the bias due to antenna coherent cross-channel coupling and is applicable in the LDR mode, the ATSR mode and the STSR orthogonal mode of weather radar measurements. In this paper, we focus on the LDR mode and consider copolar reflectivity at horizontal transmit (Z HH ), cross-polar reflectivity at horizontal transmit (Z VH ), linear depolarization ratio at horizontal transmit (LDR H ) and degree of polarization at horizontal transmit (DOP H ). The ESP (ESP) method is substantiated by an experiment carried out in November 2012 using C-band weather radar with a parabolic reflector located at the Selex ES-Gematronik facilities in Neuss, Germany. The experiment involved comparison of weather radar measurements taken 1.5 minutes apart in two hardware configurations, namely with cross-coupling on (cc-on) and cross-coupling off (cc-off). It is experimentally demonstrated that eigenvaluederived variables are invariant with respect to antenna coherent cross-channel coupling. This property had to be expected, since the eigenvalues of the Coherency matrix are SU(2) invariant. Index Terms-Antenna radiation pattern, coherency matrix, copolar radiation pattern, covariance matrix, cross-channel coupling, cross-polar correlation coefficient, cross-polar radiation pattern, degree of polarization at horizontal transmit, eigenvalues, linear depolarization ratio, polarimetric phased array weather radar. I. INTRODUCTIONT HE development of polarimetric phased array weather radars is critical for the Multi-function Phased Array Radar (MPAR) mission. The major technological challenge in phased array weather radar polarimetry is attaining an acceptable cross-polar isolation between the H and V channels of the radar system. The present paper proposes Eigenvalue Signal Processing (ESP) to mitigate the problem of antenna cross-polarization isolation, and is potentially suitable for implementation in polarimetric phased array antennas, but also in conventional parabolic reflectors. A prerequisite for the under-

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On the response of an antenna to polarized electromagnetic plane waves using a tensorial and spinorial approach

Bebbington,

Carrea

2013

Preprint

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Geometric Polarimetry [1] has recently been introduced as a new analytical framework to express fundamental relationships in polarimetry, characterizing these in geometric terms which guarantees their invariance with respect to spatial reference frame and choice of basis. It was shown via a rigorous derivation from Maxwell's equations that there is a formal argument for representing elementary coherent states algebraically as spinors, and geometrically as generators of the Poincaré sphere. While [1] only considered the characterization of field states, there is in remote sensing contexts a corresponding need also to characterize the polarization states of antennas. This needs to be completely generic and not dependent on the detailed structure of the antenna. This paper presents a derivation based on Schelkunov's reaction theorem [2] which fulfils these requirements. The statement of the theorem is translated from its usual form to a tensor representation, and this is finally reduced to obtain the new spinor representation of the antenna in terms of its polarization spinor and its phase flag.

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Geometric Polarimetry—Part I: Spinors and Wave States

Cited by 3 publications

References 49 publications

Geometric Polarimetry—Part II: The Antenna Height Spinor and the Bistatic Scattering Matrix

Geometric Polarimetry—Part II: The Antenna Height Spinor and the Bistatic Scattering Matrix

Eigenvalue Signal Processing for Weather Radar Polarimetry: Removing the Bias Induced by Antenna Coherent Cross-Channel Coupling

On the response of an antenna to polarized electromagnetic plane waves using a tensorial and spinorial approach

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