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I'm trying to interpolate some data for the purpose of plotting. For instance, given N data points, I'd like to be able to generate a "smooth" plot, made up of 10*N or so interpolated data points.

My approach is to generate an N-by-10*N matrix and compute the inner product the original vector and the matrix I generated, yielding a 1-by-10*N vector. I've already worked out the math I'd like to use for the interpolation, but my code is pretty slow. I'm pretty new to Python, so I'm hopeful that some of the experts here can give me some ideas of ways I can try to speed up my code.

I think part of the problem is that generating the matrix requires 10*N^2 calls to the following function:

def sinc(x):
    import math
    try:
        return math.sin(math.pi * x) / (math.pi * x)
    except ZeroDivisionError:
        return 1.0

(This comes from sampling theory. Essentially, I'm attempting to recreate a signal from its samples, and upsample it to a higher frequency.)

The matrix is generated by the following:

def resampleMatrix(Tso, Tsf, o, f):
    from numpy import array as npar
    retval = []

    for i in range(f):
        retval.append([sinc((Tsf*i - Tso*j)/Tso) for j in range(o)])

    return npar(retval)

I'm considering breaking up the task into smaller pieces because I don't like the idea of an N^2 matrix sitting in memory. I could probably make 'resampleMatrix' into a generator function and do the inner product row-by-row, but I don't think that will speed up my code much until I start paging stuff in and out of memory.

Thanks in advance for your suggestions!

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1  
completely aside from what you are trying to do with your code, the idea that you can just interpolate extra points with no generative model of the data is wrong. if you want to do this in any kind of statistically principled way, you need to perform some kind of regression. see en.wikipedia.org/wiki/Generative_model –  twolfe18 Dec 5 '09 at 18:50
    
It looks like Phil only wants to use interpolation for plotting. As long as the interpolated points are not used for another purpose, I don't see why one would need a generative model –  Jitse Niesen Dec 7 '09 at 10:06
    
@Phil: Any particular reason why you want to use sinc interpolation, given that it's an O(N^2) algorithm and other methods such as cubic spline are only O(N)? –  Jitse Niesen Dec 7 '09 at 10:11
1  
@twole18: The model of the data is that it was sampled according to the en.wikipedia.org/wiki/Nyquist%E2%80%93Shannon_sampling_theorem. You can recover the original exactly by using sinc functions. –  endolith Sep 21 '11 at 0:32
    
numpy already has a sinc() function, by the way. docs.scipy.org/doc/numpy/reference/generated/numpy.sinc.html –  endolith Sep 21 '11 at 0:38

8 Answers 8

up vote 5 down vote accepted

This is upsampling. See Help with resampling/upsampling for some example solutions.

A fast way to do this (for offline data, like your plotting application) is to use FFTs. This is what SciPy's native resample() function does. It assumes a periodic signal, though, so it's not exactly the same. See this reference:

Here’s the second issue regarding time-domain real signal interpolation, and it’s a big deal indeed. This exact interpolation algorithm provides correct results only if the original x(n) sequence is periodic within its full time inter­val.

Your function assumes the signal's samples are all 0 outside of the defined range, so the two methods will diverge away from the center point. If you pad the signal with lots of zeros first, it will produce a very close result. There are several more zeros past the edge of the plot not shown here:

enter image description here

Cubic interpolation won't be correct for resampling purposes. This example is an extreme case (near the sampling frequency), but as you can see, cubic interpolation isn't even close. For lower frequencies it should be pretty accurate.

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1  
Thanks for the answer! @endolith I noticed your comment below. You're right, I should have made my question clearer from the beginning. –  Phil Sep 22 '11 at 22:44

If you want to interpolate data in a quite general and fast way, splines or polynomials are very useful. Scipy has the scipy.interpolate module, which is very useful. You can find many examples in the official pages.

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Your question isn't entirely clear; you're trying to optimize the code you posted, right?

Re-writing sinc like this should speed it up considerably. This implementation avoids checking that the math module is imported on every call, doesn't do attribute access three times, and replaces exception handling with a conditional expression:

from math import sin, pi
def sinc(x):
    return (sin(pi * x) / (pi * x)) if x != 0 else 1.0

You could also try avoiding creating the matrix twice (and holding it twice in parallel in memory) by creating a numpy.array directly (not from a list of lists):

def resampleMatrix(Tso, Tsf, o, f):
    retval = numpy.zeros((f, o))
    for i in xrange(f):
        for j in xrange(o):
            retval[i][j] = sinc((Tsf*i - Tso*j)/Tso)
    return retval

(replace xrange with range on Python 3.0 and above)

Finally, you can create rows with numpy.arange as well as calling numpy.sinc on each row or even on the entire matrix:

def resampleMatrix(Tso, Tsf, o, f):
    retval = numpy.zeros((f, o))
    for i in xrange(f):
        retval[i] = numpy.arange(Tsf*i / Tso, Tsf*i / Tso - o, -1.0)
    return numpy.sinc(retval)

This should be significantly faster than your original implementation. Try different combinations of these ideas and test their performance, see which works out the best!

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"replaces exception handling with a conditional expression" but exceptions are faster than conditionals in python. also it would be faster to do pi*x once and use it twice, right? –  endolith Feb 19 at 15:16
    
@endolith It is not true that "exceptions are faster than conditionals in Python", it really depends on how often the exceptional condition happens. Anyways, that should be quite insignificant here compared to avoiding the import and attribute lookup on each function call. Not using try/except here is a matter of style and code clarity. –  taleinat Mar 12 at 11:37
    
@endolith As for pi * x, I'm not sure that creating a new local variable to avoid a single float multiplication would be beneficial. This is one of those things that you just have to test. Again, though, that's really insignificant compared to the other changes I suggested, which would have a great impact. –  taleinat Mar 12 at 11:39
    
Yes, exceptions are faster than conditionals, so if they happen rarely, code using them will be faster, too. In this case, the conditional will only happen if the input is exactly 0, which is very rare, so it's faster to use the exception. In a quick test, exception version is about 30% faster for random input, and using pix = pi*x speeds it up by about 40%, too. –  endolith Mar 13 at 2:44

I'm not quite sure what you're trying to do, but there are some speedups you can do to create the matrix. Braincore's suggestion to use numpy.sinc is a first step, but the second is to realize that numpy functions want to work on numpy arrays, where they can do loops at C speen, and can do it faster than on individual elements.

def resampleMatrix(Tso, Tsf, o, f):
    retval = numpy.sinc((Tsi*numpy.arange(i)[:,numpy.newaxis]
                         -Tso*numpy.arange(j)[numpy.newaxis,:])/Tso)
    return retval

The trick is that by indexing the aranges with the numpy.newaxis, numpy converts the array with shape i to one with shape i x 1, and the array with shape j, to shape 1 x j. At the subtraction step, numpy will "broadcast" the each input to act as a i x j shaped array and the do the subtraction. ("Broadcast" is numpy's term, reflecting the fact no additional copy is made to stretch the i x 1 to i x j.)

Now the numpy.sinc can iterate over all the elements in compiled code, much quicker than any for-loop you could write.

(There's an additional speed-up available if you do the division before the subtraction, especially since inthe latter the division cancels the multiplication.)

The only drawback is that you now pay for an extra Nx10*N array to hold the difference. This might be a dealbreaker if N is large and memory is an issue.

Otherwise, you should be able to write this using numpy.convolve. From what little I just learned about sinc-interpolation, I'd say you want something like numpy.convolve(orig,numpy.sinc(numpy.arange(j)),mode="same"). But I'm probably wrong about the specifics.

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I am attempting a convolution, so I think numpy.convolve might be the right direction to take. –  Phil Dec 8 '09 at 17:57

If your only interest is to 'generate a "smooth" plot' I would just go with a simple polynomial spline curve fit:

For any two adjacent data points the coefficients of a third degree polynomial function can be computed from the coordinates of those data points and the two additional points to their left and right (disregarding boundary points.) This will generate points on a nice smooth curve with a continuous first dirivitive. There's a straight forward formula for converting 4 coordinates to 4 polynomial coefficients but I don't want to deprive you of the fun of looking it up ;o).

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Here's a minimal example of 1d interpolation with scipy -- not as much fun as reinventing, but.
The plot looks like sinc, which is no coincidence: try google spline resample "approximate sinc".
(Presumably less local / more taps ⇒ better approximation, but I have no idea how local UnivariateSplines are.)

""" interpolate with scipy.interpolate.UnivariateSpline """
from __future__ import division
import numpy as np
from scipy.interpolate import UnivariateSpline
import pylab as pl

N = 10 
H = 8
x = np.arange(N+1)
xup = np.arange( 0, N, 1/H )
y = np.zeros(N+1);  y[N//2] = 100

interpolator = UnivariateSpline( x, y, k=3, s=0 )  # s=0 interpolates
yup = interpolator( xup )
np.set_printoptions( 1, threshold=100, suppress=True )  # .1f
print "yup:", yup

pl.plot( x, y, "green",  xup, yup, "blue" )
pl.show()

Added feb 2010: see also basic-spline-interpolation-in-a-few-lines-of-numpy

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Small improvement. Use the built-in numpy.sinc(x) function which runs in compiled C code.

Possible larger improvement: Can you do the interpolation on the fly (as the plotting occurs)? Or are you tied to a plotting library that only accepts a matrix?

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Thanks for the comment. Strangely, the code runs about 10x slower when I used numpy.sinc(x). I'm surprised! –  Phil Dec 5 '09 at 7:03
    
The plotting piece of the description was only for illustrative purposes. I'm not really worried about drawing the plot, just making the actual computation faster. Eventually this will be more of an "on the fly" type task, because I'll be processing slices of a large dataset. However, as it stands now, running through what I would consider the smallest useful slice of data requires more time than it takes the next dataset to arrive... –  Phil Dec 5 '09 at 7:21
    
What are Tso and Tsf? –  BrainCore Dec 5 '09 at 7:42
    
Tso = Initial Sample Time, Tsf = Final Sample Time. So if I start with a signal sampled at 1kHz and I want to generate 10 interpolated points for each sample (the new sample rate will be 10kHz), Tso = 0.001, Tsf = 0.0001. –  Phil Dec 5 '09 at 9:01

I recommend that you check your algorithm, as it is a non-trivial problem. Specifically, I suggest you gain access to the article "Function Plotting Using Conic Splines" (IEEE Computer Graphics and Applications) by Hu and Pavlidis (1991). Their algorithm implementation allows for adaptive sampling of the function, such that the rendering time is smaller than with regularly spaced approaches.

The abstract follows:

A method is presented whereby, given a mathematical description of a function, a conic spline approximating the plot of the function is produced. Conic arcs were selected as the primitive curves because there are simple incremental plotting algorithms for conics already included in some device drivers, and there are simple algorithms for local approximations by conics. A split-and-merge algorithm for choosing the knots adaptively, according to shape analysis of the original function based on its first-order derivatives, is introduced.

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1  
My algorithm comes from sampling theory. Essentially, I'm attempting to recreate a signal from its samples, and resample it at a higher frequency. For the purposes of plotting I'm sure my solution is not the best method... –  Phil Dec 8 '09 at 14:30
    
@Phil: You should have said that in the question –  endolith Sep 21 '11 at 0:27

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