Extraploation with 'nearest' method in Python
For linear interpolation that will extrapolate using nearest interpolation, use numpy.interp
. It does this by default.
For example:
yi = np.interp(xi, x, y)
Otherwise, if you just want nearest interpolation everywhere, as you describe, you can do it in the short, but inefficient way: (you can make this a one-liner, if you want)
def nearest_interp(xi, x, y):
idx = np.abs(x - xi[:,None])
return y[idx.argmin(axis=1)]
Or in a more efficient way using searchsorted
:
def fast_nearest_interp(xi, x, y):
"""Assumes that x is monotonically increasing!!."""
# Shift x points to centers
spacing = np.diff(x) / 2
x = x + np.hstack([spacing, spacing[-1]])
# Append the last point in y twice for ease of use
y = np.hstack([y, y[-1]])
return y[np.searchsorted(x, xi)]
To illustrate the difference between numpy.interp
and the nearest interpolation examples above:
import numpy as np
import matplotlib.pyplot as plt
def main():
x = np.array([0.1, 0.3, 1.9])
y = np.array([4, -9, 1])
xi = np.linspace(-1, 3, 200)
fig, axes = plt.subplots(nrows=2, sharex=True, sharey=True)
for ax in axes:
ax.margins(0.05)
ax.plot(x, y, 'ro')
axes[0].plot(xi, np.interp(xi, x, y), color='blue')
axes[1].plot(xi, nearest_interp(xi, x, y), color='green')
kwargs = dict(x=0.95, y=0.9, ha='right', va='top')
axes[0].set_title("Numpy's $interp$ function", **kwargs)
axes[1].set_title('Nearest Interpolation', **kwargs)
plt.show()
def nearest_interp(xi, x, y):
idx = np.abs(x - xi[:,None])
return y[idx.argmin(axis=1)]
main()