Description: 计算连续方程Lyapunov指数的程序,自己编写的,比较好用-consecutive terms of Lyapunov exponent equation procedures, the preparation of their own, more user friendly Platform: |
Size: 3072 |
Author:刘民 |
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Description: 小数据量法求混沌吸引子最大Lyapunov指数的Matlab程序,参考文献:张家树.混沌时间序列的Volterra自适应预测.物理学报.2000.03-small data method for chaotic attractor largest Lyapunov exponent of Matlab procedures References : Zhang Shu. The chaotic time series Volterra adaptive prediction. Physics reported .2000.03 Platform: |
Size: 8192 |
Author:江维 |
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Description: 小数据量方法求混沌时间序列的最大Lyapunov指数
-small amount of data methods for the chaotic time series largest Lyapunov exponent Platform: |
Size: 733184 |
Author:xujia |
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Description: he power method will be applied to the jacobian matrix of the
2-D henon map to approximate the first Lyapunov exponent by creating
a graph of ln|yn| vs. n, where n is the number of iterations of the
power method and yn = 1/n*ln|DG^n(xo)*yo|. The slope will be an
approximation to the largest Lyapunov exponent.-he power method will be applied to the jacob ian matrix of the 2-D map to approximate henon th e first Lyapunov exponent by creating a graph of ln | yn | vs. n, where n is the number of iterations of the power m ethod and yn = a/n* ln | DG ^ n (xo)* yo |. The slope w ill be an approximation to the largest Lyapunov exponent. Platform: |
Size: 1024 |
Author:杨蒙 |
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Description: 当计算混沌系统Lyapunov指数时,gs.m代码实现正交化
直接运行L2.m,可计算出Lyapunov指数(该代码是基于奇异值分解计算Lyapunov指数的)
-chaotic system when calculating Lyapunov exponent, gs.m code directly Orthogonalization L2.m operation, translate into Lyapunov exponent (The code is based on the singular value decomposition Lyapunov exponent) Platform: |
Size: 1024 |
Author:贾敏 |
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Description: 基于定义法计算Lyapunov指数。只要在matlab命令窗口中直接输入文件中函数的名称即可。-calculated based on the definition of Lyapunov exponent. Matlab as long as the order window directly onto the document function name instead. Platform: |
Size: 1024 |
Author:贾敏 |
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Description: 该函数用来计算时间序列的最大Lyapunov 指数--Wolf 方法-The function used to calculate the time series of the largest Lyapunov index Wolf method Platform: |
Size: 2048 |
Author:chryao |
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Description: 计算Lorenz系统的李雅谱诺夫指数,非常实用,稍微修改一下就可计算自己的李雅谱诺夫指数了-Lorenz system calculated Lyapunov index, very useful, you can slightly modify the calculation of their Lyapunov index of the Platform: |
Size: 2048 |
Author:Gao Xuejun |
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Description: 最大李雅普诺夫指数的计算
该函数用来计算时间序列的最大Lyapunov 指数--Wolf 方法
% m: 嵌入维数
% tau:时间延迟
% data:时间序列
% N:时间序列长度
% P:时间序列的平均周期,选择演化相点距当前点的位置差,即若当前相点为I,则演化相点只能在|I-J|>P的相点中搜寻-The largest Lyapunov exponent calculation of the function used to calculate the time series of the largest Lyapunov index Wolf method m: embedding dimension tau: time delay data: time series N: time-series length P: Time-series average cycle , select evolution with distance of the location of the current point difference, that is, if the current points for the I, the evolution of phase points can only be | I-J | Platform: |
Size: 2048 |
Author:刘于江 |
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Description: 求解lyapunov指数的经典程序。Matlab版,希望对大家有用!
-Solving lyapunov index classical procedures. Matlab version, in the hope that useful to everybody! Platform: |
Size: 3072 |
Author:banban220 |
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Description: 关于混沌系统的李氏指数计算等混沌系统中重要参数计算的代码-On chaotic systems, such as Lyapunov exponent of chaotic systems in the calculation of important parameters in the calculation code Platform: |
Size: 1782784 |
Author:sun |
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Description: 混沌时间序列分析与预测源代码。具有产生混沌时间序列,求时延,求嵌入维,求关联维,求K熵,求Lyapunov指数谱,求二进制图形的盒子维和广义维,求时间序列的盒子维和广义维,混沌时间序列预测等项功能。-Chaotic time series analysis and prediction of the source code. Has generated chaotic time series, and delay, and embedding dimension, and correlation dimension, and K-entropy, and Lyapunov exponent spectra, and the binary graphics box peacekeeping generalized dimensions, and time series of box-dimensional and generalized dimension, chaotic time series prediction functions. Platform: |
Size: 579584 |
Author:李志 |
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Description: Lyapunov exponent calcullation for ODE-system. The alogrithm employed in this m-file for determining Lyapunov exponents was proposed in A. Wolf, J. B. Swift, H. L. Swinney, and J. A. Vastano, "Determining Lyapunov Exponents from a Time Series," Physica D, Vol. 16, pp. 285-317, 1985.
For integrating ODE system can be used any MATLAB ODE-suite methods.
This function is a part of MATDS program - toolbox for dynamical system investigation
See: http://www.math.rsu.ru/mexmat/kvm/matds/
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Size: 4096 |
Author:b |
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