分数阶算子探讨被引量：1

Theory and Method of Fractional Operator and its Applications to the Modern Mechanics

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摘要简要介绍了用以描述物理和力学中的中间过程(intermediate processes)和临界现象(critical phenomena)的分数阶算子理论、方法的最新进展。分析了分数阶算子对湍流速度场的不规则起伏、Brown运动和粘弹性材料记忆性等经典力学和线性物理问题的挑战。总结了分数阶算子在线性和非线性固体遗传动力学、非Newton流体力学、生物物理和生物力学、分数阶反常扩散与随机游走理论和DLA理论等复杂系统中的应用。包括了作者近年来在这一领域所做的工作。最后,对这一学科的发展进行了展望。 Theory and method of fractional operator which is used to describe intermediate processes and critical phenomena in physics and its applications to the modern mechanics were introduced in this paper. It was pointed that the problems of classical mechanics and linear physics, such as stochastic fluctuation of turbulence velocity fields, Brown motion, memory of viscoelastic material, face the challenge of fractional operator. Applications of fractional operator in complex systems, which include solid heredity dynamics, non-Newtonian fluid mechanics, biophysics and biomechanics, fractional anomalous diffusion, stochastic walk theory and DLA theory, were discussed. The authors＇ researches on this area were introduced,and prospects of the subject were forecasted finally.

作者徐明瑜谭文长

机构地区山东大学数学与系统科学学院应用数学研究所北京大学力学与工程科学系湍流国家重点实验室

出处《太原理工大学学报》 CAS 北大核心 2005年第6期752-756,共5页 Journal of Taiyuan University of Technology

基金国家自然科学基金(10272067 10372007) 教育部博士点专项科研基金(20030422046)资助

关键词 FO理论注释展望 fractional operator theory annotation prospects

分类号 O171 [理学—基础数学]

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相关文献

参考文献5

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共引文献56

1XU Mingyu1 & TAN Wenchang2 1. Institute of Applied Mathematics, School of Math & System Science, Shandong University, Jinan 250100, China,2. State Key Laboratory of Turbulence and Complex Systems & Department of Mechanics and Engineering Science, Peking University, Beijing 100871, China.Intermediate processes and critical phenomena: Theory, method and progress of fractional operators and their applications to modern mechanics[J].Science China(Physics,Mechanics & Astronomy),2006,49(3):257-272. 被引量：15
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同被引文献7

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引证文献1

1孙克辉,任健,尚芳.分数阶混沌系统的动态仿真方法研究[J].计算机仿真,2008,25(6):312-314. 被引量：6

二级引证文献6

1蒋伟.基于分数阶偏微分方程的图像去噪新模型[J].计算机应用,2011,31(3):753-756. 被引量：16
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太原理工大学学报

2005年第6期

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分数阶算子探讨被引量：1

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分数阶算子探讨 被引量：1

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分数阶算子探讨被引量：1