Dynamics of growing surfaces by linear equations in 2+1 dimensions

doi:10.1103/PhysRevE.75.011603

淡江大學機構典藏 > 理學院 > 物理學系暨研究所 > 期刊論文 > Item 987654321/27855

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题名:	Dynamics of growing surfaces by linear equations in 2+1 dimensions
作者:	Pang, Ning-Ning;Li, Wan-Ju;Chang, Yu-Chiao;Tzeng, Wen-Jer;Wang, Juven
贡献者:	淡江大學物理學系
关键词:	Computer simulation;Correlation methods;Function evaluation;Rough set theory;Correlation functions;Rigorous analysis;Super rough interfaces;Linear equations
日期:	2007-01
上传时间:	2013-07-09 15:20:22 (UTC+8)
出版者:	College Park: American Physical Society
摘要:	An extensive study on the (2+1)-dimensional super-rough growth processes, described by a special class of linear growth equations, is undertaken. This special class of growth equations is of theoretical interests since they are exactly solvable and thus provide a window for understanding the intriguing anomalous scaling behaviors of super-rough interfaces. We first work out the exact solutions of the interfacial heights and the equal-time height difference correlation functions. Through our rigorous analysis, the detailed asymptotics of the correlation function in various time regimes are derived. Our obtained analytical results not only affirm the applicability of anomalous dynamic scaling ansatz but also offer a solid example for understanding a distinct universal feature of super-rough interfaces: the local roughness exponent is always equal to 1. Furthermore, we also perform some numerical simulations for illustration. Finally, we discuss what are the essential ingredients for constructing super-rough growth equations.
關聯:	Physical Review E (Statistical, Nonlinear, and Soft Matter Physics) 75(1), 011603(8pages)
DOI:	10.1103/PhysRevE.75.011603
显示于类别:	[物理學系暨研究所] 期刊論文

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