# Interpolate on a logarithmic scale in python

To interpolate my data I currently use this function:

``````def myinterp(x, y, der = 0, s = 0):
tck = interpolate.splrep(x, y, s = sigma)
xnew = np.arange(x[0], x[-1], (x[-1]-x[0])/x.size)
ynew = interpolate.splev(xnew, tck, der = n)
return xnew, ynew
``````

`xnew` is equivalent to `x` resampled on a regular grid with `dx=(x[-1]-x[0])/x.size`. How to do the same but with a resample of `x` on a logarithmic scale ?

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How about convert the values into logarithmic space, interpolate it linearly and then convert them back? –  starrify Nov 18 '13 at 10:55

You could just take the Logarithm, resample that linearly, and then take the exponent of it:

``````xnew = np.exp(np.arange(log(x[0]), log(x[-1]), log(x[-1]/x[0])/x.size))
``````

which could turn out quite expensive because of the repeated call to exp. A more efficient but slightly more cumbersome way would be to employ the fact that at an logarithmic scale there is a constant factor between subsequent elements:

``````f = pow(x[-1]/x[0], 1.0/(x.size-1) )
xnew[0] = x[0]
for i in range(1,x.size):
xnew[i] = xnew[i-1] * f
``````

Edit: your question says dx=(x[-1]-x[0])/x.size which looks strange to me, if you want to represent the same range using the same array size you need

``````dx=(x[-1]-x[0]) / (x.size-1)
``````

The same applies to my answer.

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