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regression - Python natural smoothing splines

I am trying to find a python package that would give an option to fit natural smoothing splines with user selectable smoothing factor. Is there an implementation for that? If not, how would you use what is available to implement it yourself?

  • By natural spline I mean that there should be a condition that the second derivative of the fitted function at the endpoints is zero (linear).

  • By smoothing spline I mean that the spline should not be 'interpolating' (passing through all the datapoints). I would like to decide the correct smoothing factor lambda (see the Wikipedia page for smoothing splines) myself.

What I have found

  • scipy.interpolate.CubicSpline [link]: Does natural (cubic) spline fitting. Does interpolation, and there is no way to smooth the data.

  • scipy.interpolate.UnivariateSpline [link]: Does spline fitting with user selectable smoothing factor. However, there is no option to make the splines natural.

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After hours of investigation, I did not find any pip installable packages which could fit a natural cubic spline with user-controllable smoothness. However, after deciding to write one myself, while reading about the topic I stumbled upon a blog post by github user madrury. He has written python code capable of producing natural cubic spline models.

The model code is available here (NaturalCubicSpline) with a BSD-licence. He has also written some examples in an IPython notebook.

But since this is the Internet and links tend to die, I will copy the relevant parts of the source code here + a helper function (get_natural_cubic_spline_model) written by me, and show an example of how to use it. The smoothness of the fit can be controlled by using different number of knots. The position of the knots can be also specified by the user.

Example

from matplotlib import pyplot as plt
import numpy as np

def func(x):
    return 1/(1+25*x**2)

# make example data
x = np.linspace(-1,1,300)
y = func(x) + np.random.normal(0, 0.2, len(x))

# The number of knots can be used to control the amount of smoothness
model_6 = get_natural_cubic_spline_model(x, y, minval=min(x), maxval=max(x), n_knots=6)
model_15 = get_natural_cubic_spline_model(x, y, minval=min(x), maxval=max(x), n_knots=15)
y_est_6 = model_6.predict(x)
y_est_15 = model_15.predict(x)


plt.plot(x, y, ls='', marker='.', label='originals')
plt.plot(x, y_est_6, marker='.', label='n_knots = 6')
plt.plot(x, y_est_15, marker='.', label='n_knots = 15')
plt.legend(); plt.show()

Example of natural cubic splines with varying smoothness.

The source code for get_natural_cubic_spline_model

import numpy as np
import pandas as pd
from sklearn.base import BaseEstimator, TransformerMixin
from sklearn.linear_model import LinearRegression
from sklearn.pipeline import Pipeline


def get_natural_cubic_spline_model(x, y, minval=None, maxval=None, n_knots=None, knots=None):
    """
    Get a natural cubic spline model for the data.

    For the knots, give (a) `knots` (as an array) or (b) minval, maxval and n_knots.

    If the knots are not directly specified, the resulting knots are equally
    space within the *interior* of (max, min).  That is, the endpoints are
    *not* included as knots.

    Parameters
    ----------
    x: np.array of float
        The input data
    y: np.array of float
        The outpur data
    minval: float 
        Minimum of interval containing the knots.
    maxval: float 
        Maximum of the interval containing the knots.
    n_knots: positive integer 
        The number of knots to create.
    knots: array or list of floats 
        The knots.

    Returns
    --------
    model: a model object
        The returned model will have following method:
        - predict(x):
            x is a numpy array. This will return the predicted y-values.
    """

    if knots:
        spline = NaturalCubicSpline(knots=knots)
    else:
        spline = NaturalCubicSpline(max=maxval, min=minval, n_knots=n_knots)

    p = Pipeline([
        ('nat_cubic', spline),
        ('regression', LinearRegression(fit_intercept=True))
    ])

    p.fit(x, y)

    return p


class AbstractSpline(BaseEstimator, TransformerMixin):
    """Base class for all spline basis expansions."""

    def __init__(self, max=None, min=None, n_knots=None, n_params=None, knots=None):
        if knots is None:
            if not n_knots:
                n_knots = self._compute_n_knots(n_params)
            knots = np.linspace(min, max, num=(n_knots + 2))[1:-1]
            max, min = np.max(knots), np.min(knots)
        self.knots = np.asarray(knots)

    @property
    def n_knots(self):
        return len(self.knots)

    def fit(self, *args, **kwargs):
        return self


class NaturalCubicSpline(AbstractSpline):
    """Apply a natural cubic basis expansion to an array.
    The features created with this basis expansion can be used to fit a
    piecewise cubic function under the constraint that the fitted curve is
    linear *outside* the range of the knots..  The fitted curve is continuously
    differentiable to the second order at all of the knots.
    This transformer can be created in two ways:
      - By specifying the maximum, minimum, and number of knots.
      - By specifying the cutpoints directly.  

    If the knots are not directly specified, the resulting knots are equally
    space within the *interior* of (max, min).  That is, the endpoints are
    *not* included as knots.
    Parameters
    ----------
    min: float 
        Minimum of interval containing the knots.
    max: float 
        Maximum of the interval containing the knots.
    n_knots: positive integer 
        The number of knots to create.
    knots: array or list of floats 
        The knots.
    """

    def _compute_n_knots(self, n_params):
        return n_params

    @property
    def n_params(self):
        return self.n_knots - 1

    def transform(self, X, **transform_params):
        X_spl = self._transform_array(X)
        if isinstance(X, pd.Series):
            col_names = self._make_names(X)
            X_spl = pd.DataFrame(X_spl, columns=col_names, index=X.index)
        return X_spl

    def _make_names(self, X):
        first_name = "{}_spline_linear".format(X.name)
        rest_names = ["{}_spline_{}".format(X.name, idx)
                      for idx in range(self.n_knots - 2)]
        return [first_name] + rest_names

    def _transform_array(self, X, **transform_params):
        X = X.squeeze()
        try:
            X_spl = np.zeros((X.shape[0], self.n_knots - 1))
        except IndexError: # For arrays with only one element
            X_spl = np.zeros((1, self.n_knots - 1))
        X_spl[:, 0] = X.squeeze()

        def d(knot_idx, x):
            def ppart(t): return np.maximum(0, t)

            def cube(t): return t*t*t
            numerator = (cube(ppart(x - self.knots[knot_idx]))
                         - cube(ppart(x - self.knots[self.n_knots - 1])))
            denominator = self.knots[self.n_knots - 1] - self.knots[knot_idx]
            return numerator / denominator

        for i in range(0, self.n_knots - 2):
            X_spl[:, i+1] = (d(i, X) - d(self.n_knots - 2, X)).squeeze()
        return X_spl

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