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I would like to simulate/model a closed-loop, linear, time-invariant system (specifically a locked PLL approximation) with python.

Each sub-block within the model has a known transfer function which is given in terms of complex frequency H(s) = K / ( s * tau + 1 ). Using the model, I would like to see how the system response as well as the noise response is affected as parameters (e.g. the VCO gain) are changed. This would involve using Bode plots and root-locus plots.

What Python modules should I seek out to get the job done?

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migrated from Nov 16 '11 at 0:02

This question came from our site for electronics and electrical engineering professionals, students, and enthusiasts.

Electrical Engineering is for questions about designing and implementing linear systems, not for their simulation and modeling; that's a topic for Stack Overflow. – Kevin Vermeer Nov 15 '11 at 23:58
Regrettably, MathJax/LaTeX isn't available on Stack Overflow; thanks for using it here but I'm editing it out for migration. – Kevin Vermeer Nov 15 '11 at 23:59
While I don't believe it (or any Python modules) contain "canned" Bode or root-locus plots, you should be able to generate your own suitable 2-D plots using matplotlib with Python. – mctylr Nov 16 '11 at 0:24
@KevinVermeer I am "designing and implementing" a linear system, but I'm using python to help, so I guess I don't understand why I was migrated. I thought I would get more help where more EE types hang out. – benpro Nov 16 '11 at 22:37
@benpro - Your question was "What Python modules should I seek out to get the job done", which is very definitely a Stack Overflow question. Many of the EE types hang out on Stack Overflow as well; I'm sorry that your're getting poor answers for now but this is a question for Stack Overflow. – Kevin Vermeer Nov 17 '11 at 0:16
up vote 10 down vote accepted

I know this is a bit old, but a search brought me to this question. I put this together when I couldn't find a good module for it. It's not much, but it's a good start if somebody else finds themselves here.

import matplotlib.pylab as plt
import numpy as np
import scipy.signal

def bode(G,f=np.arange(.01,100,.01)):
    jw = 2*np.pi*f*1j
    y = np.polyval(G.num, jw) / np.polyval(G.den, jw)
    mag = 20.0*np.log10(abs(y))
    phase = np.arctan2(y.imag, y.real)*180.0/np.pi % 360

    #plt.semilogx(jw.imag, mag)
    plt.gca().xaxis.grid(True, which='minor')

    plt.ylabel(r'Magnitude (db)')

    #plt.semilogx(jw.imag, phase)
    plt.gca().xaxis.grid(True, which='minor')
    plt.ylabel(r'Phase (deg)')
    plt.yticks(np.arange(0, phase.min()-30, -30))

    return mag, phase


Edit: I am back here because somebody upvoted this answer, you should try Control Systems Library. They have implemented the bulk of the Matlab control systems toolbox with matching syntax and everything.

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I accepted this answer after the edit about the Control Systems Library. – benpro Apr 23 '13 at 21:17

As @Matt said, I know this is old. But this came up as my first google hit, so I wanted to edit it.

You can use scipy.signal.lti to model linear, time invariant systems. That gives you lti.bode.

For an impulse response in the form of H(s) = (As^2 + Bs + C)/(Ds^2 + Es + F), you would enter h = scipy.signal.lti([A,B,C],[D,E,F]). To get the bode plot, you would do plot(*h.bode()[:2]).

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According to you can now use this:

from scipy import signal
import matplotlib.pyplot as plt

s1 = signal.lti([1], [1, 1])
w, mag, phase = signal.bode(s1)

plt.semilogx(w, mag)    # bode magnitude plot
plt.semilogx(w, phase)  # bode phase plot
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I got Bode plots working out this way, using python-control.

from matplotlib.pyplot import * # Grab MATLAB plotting functions
from control.matlab import *    # MATLAB-like functions

# Transfer functions for dynamics
G_modele = tf([1], [13500, 345, 1]);

# Use state space versions
G_modele = tf2ss(G_modele);

bode(G_modele, dB=1);

The code was mainly taken from this example which is very extensive

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scipy and numpy modules are suited for your application.

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I know and use scipy and numpy, but surely there is something more specific and targeted for linear system modeling. It may be a sub-module of numpy/scipy??? – benpro Nov 16 '11 at 22:34

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