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meaningfulalignment
meaningful alignment 一文的实现(meaningful alignment)
- 2010-05-16 13:49:50下载
- 积分:1
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tracking.rar
use a three order loop to track the GPS L2C signal, could be useful for beginner
- 2011-05-17 13:43:28下载
- 积分:1
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gaolumeiqiyucetxt
高炉煤气预测(Blast furnace gas forecastBlast furnace)
- 2021-04-27 10:08:48下载
- 积分:1
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RUN_LMS4
Least Mean Square System Identification from Adaptive Filter Theory
- 2011-11-30 06:16:35下载
- 积分:1
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Matlab_MA3457
MATLAB Course
Adriana Hera
puting Communications Center Computing & Communications Center
1 . V ariables, Operators
2.Matrices
3.Matlab Functions
4.Relational operators & Loops (Flow Control)
5.Scripts
6 U D fi d F ti 6 . U ser D e fined F unc tions
7.Visualization
8. Curve fitting: Poly nomial curve fittin g gy g
9. Interpolation
10.Publishing a script to HTML
- 2013-11-19 14:50:23下载
- 积分:1
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anneal
Matlab code for computing the root(s) of a maximum likelihood function.
- 2011-12-24 04:12:26下载
- 积分:1
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自适应模糊PID控制模型
将模糊自适应控制与PID控制算法结合起来,建立模型并利用simulink进行仿真。(Combining fuzzy adaptive control with PID control algorithm, the model is built and simulated in simulink.)
- 2019-01-27 14:48:20下载
- 积分:1
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aw
说明: 车辆系统动力性单轮模型,根据运动方程计算车轮位移和车身位移的频率响应函数,以及系统响应输出的功率谱密度(Single wheel vehicle system dynamic model, calculated according to the equation of motion wheel displacement and Body displacement frequency response function, and the system responds with output power spectral density)
- 2012-09-19 15:09:30下载
- 积分:1
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FDTDzhalan
激励源为高斯脉冲波形的二维 平行板FDTD(时域有限差分)TM波仿真 (Excitation source for the two-dimensional Gaussian pulse waveform parallel plate FDTD (Finite Difference Time Domain) TM wave simulation)
- 2014-05-04 11:06:12下载
- 积分:1
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EllipseFitByTaubin
This is a fast non-iterative ellipse fit, and among fast non-iterative ellipse fits this is the most accurate and robust.
It takes the xy-coordinates of data points, and returns the coefficients of the equation of the ellipse:
ax^2 + bxy + cy^2 + dx + ey + f = 0,
i.e. it returns the vector A=(a,b,c,d,e,f). To convert this vector to the geometric parameters (This is a fast non-iterative ellipse fit, and among fast non-iterative ellipse fits this is the most accurate and robust.
It takes the xy-coordinates of data points, and returns the coefficients of the equation of the ellipse:
ax^2+ bxy+ cy^2+ dx+ ey+ f = 0,
i.e. it returns the vector A=(a,b,c,d,e,f). To convert this vector to the geometric parameters )
- 2009-10-19 20:29:44下载
- 积分:1