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I have some data of a particle moving in a corridor with closed boundary conditions. Plotting the trajectory leads to a zig-zag-trajectory. enter image description here

I would like to know how to hinder plot() from connecting the points, where the particle comes back to the start. Some thing like in the upper part of the pic, but without "."

First idea I had is to find the index when the numpy array a[:-1]-a[1:] gets positiv. And then plot from 0 to that index. But how to get the index of the first occurrence of a positive element of a[:-1]-a[1:]? Maybe there are some other ideas.

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There is a lot to be said for just not connecting the data points. –  Michael J. Barber Jan 16 '13 at 13:31

3 Answers 3

up vote 9 down vote accepted

I'd go a different approach. First, I'd determine the jump points not by looking at the sign of the derivative, as probably the movement might go up or down, or even have some periodicity in it. I'd look at those points with the biggest derivative.

Second, an elegant approach to have breaks in a plot line is to mask one value on each jump. Then matplotlib will make segments automatically. My code is:

import pylab as plt
import numpy as np

xs = np.linspace(0., 100., 1000.)
data = (xs*0.03 + np.sin(xs) * 0.1) % 1

plt.subplot(2,1,1)
plt.plot(xs, data, "r-")

#Make a masked array with jump points masked
abs_d_data = np.abs(np.diff(data))
mask = np.hstack([ abs_d_data > abs_d_data.mean()+3*abs_d_data.std(), [False]])
masked_data = np.ma.MaskedArray(data, mask)
plt.subplot(2,1,2)
plt.plot(xs, masked_data, "b-")

plt.show()

And gives us as result: enter image description here

The disadvantage of course is that you lose one point at each break - but with the sampling rate you seem to have I guess you can trade this in for simpler code.

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+1) -- I learned a very elegant use case for masked array in matplotlib –  Theodros Zelleke Jan 18 '13 at 13:54
    
I found a case where this solution fails. It is the case where the trajectory has no breaks in it. My fix was just to check the std if it is larger than some minimum (ad-hoc chosed). –  Tengis Mar 1 '13 at 14:06

To find where the particle has crossed the upper boundary, you can do something like this:

>>> import numpy as np
>>> a = np.linspace(0, 10, 50) % 5
>>> a = np.linspace(0, 10, 50) % 5 # some sample data
>>> np.nonzero(np.diff(a) < 0)[0] + 1
array([25, 49])
>>> a[24:27]
array([ 4.89795918,  0.10204082,  0.30612245])
>>> a[48:]
array([ 4.79591837,  0.        ])
>>> 

np.diff(a) calculates the discrete difference of a, while np.nonzero finds where the condition np.diff(a) < 0 is negative, i.e., the particle has moved downward.

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To avoid the connecting line you will have to plot by segments.

Here's a quick way to plot by segments when the derivative of a changes sign:

import numpy as np
a = np.linspace(0, 20, 50) % 5  # similar to Micheal's sample data
x = np.arange(50)  # x scale

indices = np.where(np.diff(a) < 0)[0] + 1  # the same as Micheal's np.nonzero
for n, i in enumerate(indices):
    if n == 0:
        plot(x[:i], a[:i], 'b-')
    else:
        plot(x[indices[n - 1]:i], a[indices[n - 1]:i], 'b-')

enter image description here

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