Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation

doi:10.1088/1009-1963/15/1/008

中国物理B ›› 2006, Vol. 15 ›› Issue (1): 45-52.doi: 10.1088/1009-1963/15/1/008

Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation

马正义, 郑春龙

College of Science, Zhejiang Lishui University, Lishui 323000, China;Shanghai Institute of Applied Mathematics and Mechanics, Shanghai University, Shanghai 200072, China

收稿日期:2004-08-16 修回日期:2005-06-17 出版日期:2006-01-20 发布日期:2006-01-20
基金资助:
Project supported by the National Natural Science Foundation of China (Grant No 10272071), the Natural Science Foundation of Zhejiang Province, China (Grant No Y604106) and the Key Academic Discipline of Zhejiang Province, China (Grant No 200412).

Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation

Ma Zheng-Yi (马正义), Zheng Chun-Long (郑春龙)

College of Science, Zhejiang Lishui University, Lishui 323000, China;Shanghai Institute of Applied Mathematics and Mechanics, Shanghai University, Shanghai 200072, China

Received:2004-08-16 Revised:2005-06-17 Online:2006-01-20 Published:2006-01-20
Supported by:
Project supported by the National Natural Science Foundation of China (Grant No 10272071), the Natural Science Foundation of Zhejiang Province, China (Grant No Y604106) and the Key Academic Discipline of Zhejiang Province, China (Grant No 200412).

摘要/Abstract

摘要： Using the mapping approach via a Riccati equation, a series of variable separation excitations with three arbitrary functions for the (2+1)-dimensional dispersive long wave (DLW) equation are derived. In addition to the usual localized coherent soliton excitations like dromions, rings, peakons and compactions, etc, some new types of excitations that possess fractal behaviour are obtained by introducing appropriate lower-dimensional localized patterns and Jacobian elliptic functions.

Abstract: Using the mapping approach via a Riccati equation, a series of variable separation excitations with three arbitrary functions for the (2+1)-dimensional dispersive long wave (DLW) equation are derived. In addition to the usual localized coherent soliton excitations like dromions, rings, peakons and compactions, etc, some new types of excitations that possess fractal behaviour are obtained by introducing appropriate lower-dimensional localized patterns and Jacobian elliptic functions.

Key words: mapping approach, DLW equation, explicit solution, fractal

中图分类号: (Fractals)

05.45.Df

05.45.Yv (Solitons)

马正义, 郑春龙. Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation[J]. 中国物理B, 2006, 15(1): 45-52.

Ma Zheng-Yi (马正义), Zheng Chun-Long (郑春龙). Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation[J]. Chinese Physics, 2006, 15(1): 45-52.

[1]	Meili Liu(刘美丽), Xiaogang Qi(齐小刚), and Hao Pan(潘浩). Multifractal analysis of the software evolution in software networks[J]. 中国物理B, 2022, 31(3): 30501-030501.
[2]	Yong-Jin Xian(咸永锦), Xing-Yuan Wang(王兴元), Ying-Qian Zhang(张盈谦), Xiao-Yu Wang(王晓雨), and Xiao-Hui Du(杜晓慧). Fractal sorting vector-based least significant bit chaotic permutation for image encryption[J]. 中国物理B, 2021, 30(6): 60508-060508.
[3]	. [J]. 中国物理B, 2021, 30(2): 20501-0.
[4]	. [J]. 中国物理B, 2021, 30(1): 17901-.
[5]	刘泽宇, 夏铁成, 王金波. Image encryption technique based on new two-dimensional fractional-order discrete chaotic map and Menezes-Vanstone elliptic curve cryptosystem[J]. 中国物理B, 2018, 27(3): 30502-030502.
[6]	杨媛媛, 陈伟, 谢涛. Detection of meso-micro scale surface features based on microcanonical multifractal formalism[J]. 中国物理B, 2018, 27(1): 10502-010502.
[7]	闭胜, 高剑波. Multifractal modeling of the production of concentrated sugar syrup crystal[J]. 中国物理B, 2016, 25(7): 70502-070502.
[8]	余永明, 杨立才, 周茜, 赵璐璐, 刘治平. Exploring the relationship between fractal features and bacterial essential genes[J]. 中国物理B, 2016, 25(6): 60503-060503.
[9]	倪黄晶, 周泸萍, 曾彭, 黄晓林, 刘红星, 宁新宝, the Alzheimer's Disease Neuroimaging Initiative. Multifractal analysis of white matter structural changes on 3D magnetic resonance imaging between normal aging and early Alzheimer's disease[J]. 中国物理B, 2015, 24(7): 70502-070502.
[10]	乔威, 孙洁, 刘树堂. Directional region control of the thermalfractal diffusion of a space body[J]. 中国物理B, 2015, 24(5): 50504-050504.
[11]	Emad K. El-Shewy, Abeer A. Mahmoud, Ashraf M. Tawfik, Essam M. Abulwafa, Ahmed Elgarayhi. Space–time fractional KdV–Burgers equation for dust acoustic shock waves in dusty plasma with non-thermal ions[J]. , 2014, 23(7): 70505-070505.
[12]	肖琴, 潘雪, 李信利, Mutua Stephen, 杨会杰, 蒋艳, 王建勇, 张庆军. Row-column visibility graph approach to two-dimensional landscapes[J]. , 2014, 23(7): 78904-078904.
[13]	Bilal Shoaib, Ijaz Mansoor Qureshi, Shafqatullah, Ihsanulhaq. Adaptive step-size modified fractional least mean square algorithm for chaotic time series prediction[J]. 中国物理B, 2014, 23(5): 50503-050503.
[14]	蔡建超. A fractal approach to low velocity non-Darcy flow in a low permeability porous medium[J]. 中国物理B, 2014, 23(4): 44701-044701.
[15]	Bilal Shoaib, Ijaz Mansoor Qureshi, Ihsanulhaq, Shafqatullah. A modified fractional least mean square algorithm for chaotic and nonstationary time series prediction[J]. 中国物理B, 2014, 23(3): 30502-030502.

Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation

Two classes of fractal structures for the (2+1)-dimensional dispersive long wave equation

PDF (PC)

赞

可视化

摘要/Abstract

引用本文

使用本文

参考文献

相关文章 15

Metrics

本文评价

推荐阅读 0