The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. ex. Some numerals are expressed as "XNUMX".
Copyrights notice
The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. Copyrights notice
본 논문에서는 Foschini와 Poole의 복굴절 벡터 모델에 대한 PMD(편광 모드 분산) 벡터의 일시적인 동작을 분석합니다. 우리는 르장드르 다항식을 특징으로 하는 각 성분의 중첩으로 해를 나타내는 해당 Fokker-Planck 방정식의 점근 해를 찾습니다. PMD 벡터 크기에 대한 분포 꼬리는 인접한 각도 구성요소 사이의 잔류 결합으로 인해 천천히 맥스웰식으로 전개됩니다. 특히 흥미로운 점은 PMD 벡터 크기의 분포 꼬리가 과도기 동안 Maxwellian 적합치보다 훨씬 아래에 있다는 것입니다.
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부
Jae-Seung LEE, "Analysis of the Polarization-Mode-Dispersion Vector Distribution for the Foschini and Poole's Birefringence Vector Model" in IEICE TRANSACTIONS on Communications,
vol. E92-B, no. 10, pp. 3111-3114, October 2009, doi: 10.1587/transcom.E92.B.3111.
Abstract: This paper analyzes transient behaviors of the polarization-mode-dispersion (PMD) vector for the Foschini and Poole's birefringence vector model. We find an asymptotic solution of the corresponding Fokker-Planck equation representing the solution as a superposition of angular components characterized by the Legendre polynomials. The distribution tail for the PMD vector magnitude evolves slowly to the Maxwellian owing to the residual couplings between adjacent angular components. Of particular interest, the distribution tail for the PMD vector magnitude lies well below the Maxwellian fit during the transient.
URL: https://global.ieice.org/en_transactions/communications/10.1587/transcom.E92.B.3111/_p
부
@ARTICLE{e92-b_10_3111,
author={Jae-Seung LEE, },
journal={IEICE TRANSACTIONS on Communications},
title={Analysis of the Polarization-Mode-Dispersion Vector Distribution for the Foschini and Poole's Birefringence Vector Model},
year={2009},
volume={E92-B},
number={10},
pages={3111-3114},
abstract={This paper analyzes transient behaviors of the polarization-mode-dispersion (PMD) vector for the Foschini and Poole's birefringence vector model. We find an asymptotic solution of the corresponding Fokker-Planck equation representing the solution as a superposition of angular components characterized by the Legendre polynomials. The distribution tail for the PMD vector magnitude evolves slowly to the Maxwellian owing to the residual couplings between adjacent angular components. Of particular interest, the distribution tail for the PMD vector magnitude lies well below the Maxwellian fit during the transient.},
keywords={},
doi={10.1587/transcom.E92.B.3111},
ISSN={1745-1345},
month={October},}
부
TY - JOUR
TI - Analysis of the Polarization-Mode-Dispersion Vector Distribution for the Foschini and Poole's Birefringence Vector Model
T2 - IEICE TRANSACTIONS on Communications
SP - 3111
EP - 3114
AU - Jae-Seung LEE
PY - 2009
DO - 10.1587/transcom.E92.B.3111
JO - IEICE TRANSACTIONS on Communications
SN - 1745-1345
VL - E92-B
IS - 10
JA - IEICE TRANSACTIONS on Communications
Y1 - October 2009
AB - This paper analyzes transient behaviors of the polarization-mode-dispersion (PMD) vector for the Foschini and Poole's birefringence vector model. We find an asymptotic solution of the corresponding Fokker-Planck equation representing the solution as a superposition of angular components characterized by the Legendre polynomials. The distribution tail for the PMD vector magnitude evolves slowly to the Maxwellian owing to the residual couplings between adjacent angular components. Of particular interest, the distribution tail for the PMD vector magnitude lies well below the Maxwellian fit during the transient.
ER -