CLASSICAL AREAS OF PHENOMENOLOGY |
Prev
Next
|
|
|
Elegant Ince–Gaussian beams in a quadratic-index medium |
Bai Zhi-Yong(白志勇), Deng Dong-Mei(邓冬梅), and Guo Qi(郭旗)† |
Key Laboratory of Photonic Information Technology of Guangdong Higher Education Institutes, South China Normal University, Guangzhou 510631, China |
|
|
Abstract Elegant Ince—Gaussian beams, which are the exact solutions of the paraxial wave equation in a quadratic-index medium, are derived in elliptical coordinates. These kinds of beams are the alternative form of standard Ince—Gaussian beams and they display better symmetry between the Ince-polynomials and the Gaussian function in mathematics. The transverse intensity distribution and the phase of the elegant Ince—Gaussian beams are discussed.
|
Received: 09 March 2011
Revised: 23 March 2011
Accepted manuscript online:
|
PACS:
|
42.25.Bs
|
(Wave propagation, transmission and absorption)
|
|
42.65.-k
|
(Nonlinear optics)
|
|
42.65.Tg
|
(Optical solitons; nonlinear guided waves)
|
|
Cite this article:
Bai Zhi-Yong(白志勇), Deng Dong-Mei(邓冬梅), and Guo Qi(郭旗) Elegant Ince–Gaussian beams in a quadratic-index medium 2011 Chin. Phys. B 20 094202
|
[1] |
Liu C Y, Deng D M, Hu W and Guo H 2002 Acta Phys. Sin. 51 524 (in Chinese)
|
[2] |
Yang Z F, Yang Z J and Hu W 2007 Acta Phys. Sin. 56 859 (in Chinese)
|
[3] |
Siegman A E 1986 Lasers (Mill Valley: University Science) p. 644
|
[4] |
Bandres M A and Guti'errez-Vega J C 2004 Opt. Lett. 29 144
|
[5] |
Siegman A E 1973 J. Opt. Soc. Am. 63 1093
|
[6] |
Takenaka T, Yokota M and Fukumitsu O 1985 J. Opt. Soc. Am. A 2 826
|
[7] |
Bandres M A 2004 Opt. Lett. 29 1724
|
[8] |
Deng D M and Guo Q 2008 Opt. Lett. 33 1225
|
[9] |
Shin S Y and Felsen L B 1977 J. Opt. Soc. Am. 67 699
|
[10] |
Zauderer E 1986 J. Opt. Soc. Am. A 3 465
|
[11] |
Tien P K, Gordon J P and Whinnery J R 1965 Proc. IEEE bf 53 129
|
[12] |
Newstein M and Lin K 1987 Proc. IEEE 23 481
|
[13] |
Guti'errez-Vega J C and Bandres M A 2005 J. Opt. Soc. Am. A 22 306
|
[14] |
Haus H A 1985 Waves and Fields in Optoelectronics (Taipei: Central Book Company) p. 139
|
[15] |
Snyder A W and Mitchell D J 1997 Science bf 276 1538
|
[16] |
Lopez-Aguayo S and Guti'errez-Vega J C 2007 Phys. Rev. A 76 023814
|
[17] |
Guo Q, Luo B, Chi S and Xie Y 2004 Phys. Rev. E 69 016602
|
[18] |
Guo Q, Zhang X P, Hu W and Shou Q 2006 Acta Phys. Sin. bf 55 1832 (in Chinese)
|
[19] |
Arscott F M 1964 Periodic Differential Equations (Oxford: Pergamon Press)
|
No Suggested Reading articles found! |
|
|
Viewed |
|
|
|
Full text
|
|
|
|
|
Abstract
|
|
|
|
|
Cited |
|
|
|
|
Altmetric
|
blogs
Facebook pages
Wikipedia page
Google+ users
|
Online attention
Altmetric calculates a score based on the online attention an article receives. Each coloured thread in the circle represents a different type of online attention. The number in the centre is the Altmetric score. Social media and mainstream news media are the main sources that calculate the score. Reference managers such as Mendeley are also tracked but do not contribute to the score. Older articles often score higher because they have had more time to get noticed. To account for this, Altmetric has included the context data for other articles of a similar age.
View more on Altmetrics
|
|
|