from __future__ import print_function, division, absolute_import __all__ = ['splrep', 'splprep', 'splev', 'splint', 'sproot', 'spalde', 'bisplrep', 'bisplev', 'insert', 'splder', 'splantider'] import warnings import numpy as np from ._fitpack_impl import bisplrep, bisplev, dblint from . import _fitpack_impl as _impl from ._bsplines import BSpline def splprep(x, w=None, u=None, ub=None, ue=None, k=3, task=0, s=None, t=None, full_output=0, nest=None, per=0, quiet=1): """ Find the B-spline representation of an N-dimensional curve. Given a list of N rank-1 arrays, `x`, which represent a curve in N-dimensional space parametrized by `u`, find a smooth approximating spline curve g(`u`). Uses the FORTRAN routine parcur from FITPACK. Parameters ---------- x : array_like A list of sample vector arrays representing the curve. w : array_like, optional Strictly positive rank-1 array of weights the same length as `x[0]`. The weights are used in computing the weighted least-squares spline fit. If the errors in the `x` values have standard-deviation given by the vector d, then `w` should be 1/d. Default is ``ones(len(x[0]))``. u : array_like, optional An array of parameter values. If not given, these values are calculated automatically as ``M = len(x[0])``, where v[0] = 0 v[i] = v[i-1] + distance(`x[i]`, `x[i-1]`) u[i] = v[i] / v[M-1] ub, ue : int, optional The end-points of the parameters interval. Defaults to u[0] and u[-1]. k : int, optional Degree of the spline. Cubic splines are recommended. Even values of `k` should be avoided especially with a small s-value. ``1 <= k <= 5``, default is 3. task : int, optional If task==0 (default), find t and c for a given smoothing factor, s. If task==1, find t and c for another value of the smoothing factor, s. There must have been a previous call with task=0 or task=1 for the same set of data. If task=-1 find the weighted least square spline for a given set of knots, t. s : float, optional A smoothing condition. The amount of smoothness is determined by satisfying the conditions: ``sum((w * (y - g))**2,axis=0) <= s``, where g(x) is the smoothed interpolation of (x,y). The user can use `s` to control the trade-off between closeness and smoothness of fit. Larger `s` means more smoothing while smaller values of `s` indicate less smoothing. Recommended values of `s` depend on the weights, w. If the weights represent the inverse of the standard-deviation of y, then a good `s` value should be found in the range ``(m-sqrt(2*m),m+sqrt(2*m))``, where m is the number of data points in x, y, and w. t : int, optional The knots needed for task=-1. full_output : int, optional If non-zero, then return optional outputs. nest : int, optional An over-estimate of the total number of knots of the spline to help in determining the storage space. By default nest=m/2. Always large enough is nest=m+k+1. per : int, optional If non-zero, data points are considered periodic with period ``x[m-1] - x[0]`` and a smooth periodic spline approximation is returned. Values of ``y[m-1]`` and ``w[m-1]`` are not used. quiet : int, optional Non-zero to suppress messages. This parameter is deprecated; use standard Python warning filters instead. Returns ------- tck : tuple (t,c,k) a tuple containing the vector of knots, the B-spline coefficients, and the degree of the spline. u : array An array of the values of the parameter. fp : float The weighted sum of squared residuals of the spline approximation. ier : int An integer flag about splrep success. Success is indicated if ier<=0. If ier in [1,2,3] an error occurred but was not raised. Otherwise an error is raised. msg : str A message corresponding to the integer flag, ier. See Also -------- splrep, splev, sproot, spalde, splint, bisplrep, bisplev UnivariateSpline, BivariateSpline BSpline make_interp_spline Notes ----- See `splev` for evaluation of the spline and its derivatives. The number of dimensions N must be smaller than 11. The number of coefficients in the `c` array is ``k+1`` less then the number of knots, ``len(t)``. This is in contrast with `splrep`, which zero-pads the array of coefficients to have the same length as the array of knots. These additional coefficients are ignored by evaluation routines, `splev` and `BSpline`. References ---------- .. [1] P. Dierckx, "Algorithms for smoothing data with periodic and parametric splines, Computer Graphics and Image Processing", 20 (1982) 171-184. .. [2] P. Dierckx, "Algorithms for smoothing data with periodic and parametric splines", report tw55, Dept. Computer Science, K.U.Leuven, 1981. .. [3] P. Dierckx, "Curve and surface fitting with splines", Monographs on Numerical Analysis, Oxford University Press, 1993. Examples -------- Generate a discretization of a limacon curve in the polar coordinates: >>> phi = np.linspace(0, 2.*np.pi, 40) >>> r = 0.5 + np.cos(phi) # polar coords >>> x, y = r * np.cos(phi), r * np.sin(phi) # convert to cartesian And interpolate: >>> from scipy.interpolate import splprep, splev >>> tck, u = splprep([x, y], s=0) >>> new_points = splev(u, tck) Notice that (i) we force interpolation by using `s=0`, (ii) the parameterization, ``u``, is generated automatically. Now plot the result: >>> import matplotlib.pyplot as plt >>> fig, ax = plt.subplots() >>> ax.plot(x, y, 'ro') >>> ax.plot(new_points[0], new_points[1], 'r-') >>> plt.show() """ res = _impl.splprep(x, w, u, ub, ue, k, task, s, t, full_output, nest, per, quiet) return res def splrep(x, y, w=None, xb=None, xe=None, k=3, task=0, s=None, t=None, full_output=0, per=0, quiet=1): """ Find the B-spline representation of 1-D curve. Given the set of data points ``(x[i], y[i])`` determine a smooth spline approximation of degree k on the interval ``xb <= x <= xe``. Parameters ---------- x, y : array_like The data points defining a curve y = f(x). w : array_like, optional Strictly positive rank-1 array of weights the same length as x and y. The weights are used in computing the weighted least-squares spline fit. If the errors in the y values have standard-deviation given by the vector d, then w should be 1/d. Default is ones(len(x)). xb, xe : float, optional The interval to fit. If None, these default to x[0] and x[-1] respectively. k : int, optional The degree of the spline fit. It is recommended to use cubic splines. Even values of k should be avoided especially with small s values. 1 <= k <= 5 task : {1, 0, -1}, optional If task==0 find t and c for a given smoothing factor, s. If task==1 find t and c for another value of the smoothing factor, s. There must have been a previous call with task=0 or task=1 for the same set of data (t will be stored an used internally) If task=-1 find the weighted least square spline for a given set of knots, t. These should be interior knots as knots on the ends will be added automatically. s : float, optional A smoothing condition. The amount of smoothness is determined by satisfying the conditions: sum((w * (y - g))**2,axis=0) <= s where g(x) is the smoothed interpolation of (x,y). The user can use s to control the tradeoff between closeness and smoothness of fit. Larger s means more smoothing while smaller values of s indicate less smoothing. Recommended values of s depend on the weights, w. If the weights represent the inverse of the standard-deviation of y, then a good s value should be found in the range (m-sqrt(2*m),m+sqrt(2*m)) where m is the number of datapoints in x, y, and w. default : s=m-sqrt(2*m) if weights are supplied. s = 0.0 (interpolating) if no weights are supplied. t : array_like, optional The knots needed for task=-1. If given then task is automatically set to -1. full_output : bool, optional If non-zero, then return optional outputs. per : bool, optional If non-zero, data points are considered periodic with period x[m-1] - x[0] and a smooth periodic spline approximation is returned. Values of y[m-1] and w[m-1] are not used. quiet : bool, optional Non-zero to suppress messages. This parameter is deprecated; use standard Python warning filters instead. Returns ------- tck : tuple A tuple (t,c,k) containing the vector of knots, the B-spline coefficients, and the degree of the spline. fp : array, optional The weighted sum of squared residuals of the spline approximation. ier : int, optional An integer flag about splrep success. Success is indicated if ier<=0. If ier in [1,2,3] an error occurred but was not raised. Otherwise an error is raised. msg : str, optional A message corresponding to the integer flag, ier. See Also -------- UnivariateSpline, BivariateSpline splprep, splev, sproot, spalde, splint bisplrep, bisplev BSpline make_interp_spline Notes ----- See `splev` for evaluation of the spline and its derivatives. Uses the FORTRAN routine ``curfit`` from FITPACK. The user is responsible for assuring that the values of `x` are unique. Otherwise, `splrep` will not return sensible results. If provided, knots `t` must satisfy the Schoenberg-Whitney conditions, i.e., there must be a subset of data points ``x[j]`` such that ``t[j] < x[j] < t[j+k+1]``, for ``j=0, 1,...,n-k-2``. This routine zero-pads the coefficients array ``c`` to have the same length as the array of knots ``t`` (the trailing ``k + 1`` coefficients are ignored by the evaluation routines, `splev` and `BSpline`.) This is in contrast with `splprep`, which does not zero-pad the coefficients. References ---------- Based on algorithms described in [1]_, [2]_, [3]_, and [4]_: .. [1] P. Dierckx, "An algorithm for smoothing, differentiation and integration of experimental data using spline functions", J.Comp.Appl.Maths 1 (1975) 165-184. .. [2] P. Dierckx, "A fast algorithm for smoothing data on a rectangular grid while using spline functions", SIAM J.Numer.Anal. 19 (1982) 1286-1304. .. [3] P. Dierckx, "An improved algorithm for curve fitting with spline functions", report tw54, Dept. Computer Science,K.U. Leuven, 1981. .. [4] P. Dierckx, "Curve and surface fitting with splines", Monographs on Numerical Analysis, Oxford University Press, 1993. Examples -------- >>> import matplotlib.pyplot as plt >>> from scipy.interpolate import splev, splrep >>> x = np.linspace(0, 10, 10) >>> y = np.sin(x) >>> spl = splrep(x, y) >>> x2 = np.linspace(0, 10, 200) >>> y2 = splev(x2, spl) >>> plt.plot(x, y, 'o', x2, y2) >>> plt.show() """ res = _impl.splrep(x, y, w, xb, xe, k, task, s, t, full_output, per, quiet) return res def splev(x, tck, der=0, ext=0): """ Evaluate a B-spline or its derivatives. Given the knots and coefficients of a B-spline representation, evaluate the value of the smoothing polynomial and its derivatives. This is a wrapper around the FORTRAN routines splev and splder of FITPACK. Parameters ---------- x : array_like An array of points at which to return the value of the smoothed spline or its derivatives. If `tck` was returned from `splprep`, then the parameter values, u should be given. tck : 3-tuple or a BSpline object If a tuple, then it should be a sequence of length 3 returned by `splrep` or `splprep` containing the knots, coefficients, and degree of the spline. (Also see Notes.) der : int, optional The order of derivative of the spline to compute (must be less than or equal to k). ext : int, optional Controls the value returned for elements of ``x`` not in the interval defined by the knot sequence. * if ext=0, return the extrapolated value. * if ext=1, return 0 * if ext=2, raise a ValueError * if ext=3, return the boundary value. The default value is 0. Returns ------- y : ndarray or list of ndarrays An array of values representing the spline function evaluated at the points in `x`. If `tck` was returned from `splprep`, then this is a list of arrays representing the curve in N-dimensional space. Notes ----- Manipulating the tck-tuples directly is not recommended. In new code, prefer using `BSpline` objects. See Also -------- splprep, splrep, sproot, spalde, splint bisplrep, bisplev BSpline References ---------- .. [1] C. de Boor, "On calculating with b-splines", J. Approximation Theory, 6, p.50-62, 1972. .. [2] M. G. Cox, "The numerical evaluation of b-splines", J. Inst. Maths Applics, 10, p.134-149, 1972. .. [3] P. Dierckx, "Curve and surface fitting with splines", Monographs on Numerical Analysis, Oxford University Press, 1993. """ if isinstance(tck, BSpline): if tck.c.ndim > 1: mesg = ("Calling splev() with BSpline objects with c.ndim > 1 is " "not recommended. Use BSpline.__call__(x) instead.") warnings.warn(mesg, DeprecationWarning) # remap the out-of-bounds behavior try: extrapolate = {0: True, }[ext] except KeyError: raise ValueError("Extrapolation mode %s is not supported " "by BSpline." % ext) return tck(x, der, extrapolate=extrapolate) else: return _impl.splev(x, tck, der, ext) def splint(a, b, tck, full_output=0): """ Evaluate the definite integral of a B-spline between two given points. Parameters ---------- a, b : float The end-points of the integration interval. tck : tuple or a BSpline instance If a tuple, then it should be a sequence of length 3, containing the vector of knots, the B-spline coefficients, and the degree of the spline (see `splev`). full_output : int, optional Non-zero to return optional output. Returns ------- integral : float The resulting integral. wrk : ndarray An array containing the integrals of the normalized B-splines defined on the set of knots. (Only returned if `full_output` is non-zero) Notes ----- `splint` silently assumes that the spline function is zero outside the data interval (`a`, `b`). Manipulating the tck-tuples directly is not recommended. In new code, prefer using the `BSpline` objects. See Also -------- splprep, splrep, sproot, spalde, splev bisplrep, bisplev BSpline References ---------- .. [1] P.W. Gaffney, The calculation of indefinite integrals of b-splines", J. Inst. Maths Applics, 17, p.37-41, 1976. .. [2] P. Dierckx, "Curve and surface fitting with splines", Monographs on Numerical Analysis, Oxford University Press, 1993. """ if isinstance(tck, BSpline): if tck.c.ndim > 1: mesg = ("Calling splint() with BSpline objects with c.ndim > 1 is " "not recommended. Use BSpline.integrate() instead.") warnings.warn(mesg, DeprecationWarning) if full_output != 0: mesg = ("full_output = %s is not supported. Proceeding as if " "full_output = 0" % full_output) return tck.integrate(a, b, extrapolate=False) else: return _impl.splint(a, b, tck, full_output) def sproot(tck, mest=10): """ Find the roots of a cubic B-spline. Given the knots (>=8) and coefficients of a cubic B-spline return the roots of the spline. Parameters ---------- tck : tuple or a BSpline object If a tuple, then it should be a sequence of length 3, containing the vector of knots, the B-spline coefficients, and the degree of the spline. The number of knots must be >= 8, and the degree must be 3. The knots must be a montonically increasing sequence. mest : int, optional An estimate of the number of zeros (Default is 10). Returns ------- zeros : ndarray An array giving the roots of the spline. Notes ----- Manipulating the tck-tuples directly is not recommended. In new code, prefer using the `BSpline` objects. See also -------- splprep, splrep, splint, spalde, splev bisplrep, bisplev BSpline References ---------- .. [1] C. de Boor, "On calculating with b-splines", J. Approximation Theory, 6, p.50-62, 1972. .. [2] M. G. Cox, "The numerical evaluation of b-splines", J. Inst. Maths Applics, 10, p.134-149, 1972. .. [3] P. Dierckx, "Curve and surface fitting with splines", Monographs on Numerical Analysis, Oxford University Press, 1993. """ if isinstance(tck, BSpline): if tck.c.ndim > 1: mesg = ("Calling sproot() with BSpline objects with c.ndim > 1 is " "not recommended.") warnings.warn(mesg, DeprecationWarning) t, c, k = tck.tck # _impl.sproot expects the interpolation axis to be last, so roll it. # NB: This transpose is a no-op if c is 1D. sh = tuple(range(c.ndim)) c = c.transpose(sh[1:] + (0,)) return _impl.sproot((t, c, k), mest) else: return _impl.sproot(tck, mest) def spalde(x, tck): """ Evaluate all derivatives of a B-spline. Given the knots and coefficients of a cubic B-spline compute all derivatives up to order k at a point (or set of points). Parameters ---------- x : array_like A point or a set of points at which to evaluate the derivatives. Note that ``t(k) <= x <= t(n-k+1)`` must hold for each `x`. tck : tuple A tuple ``(t, c, k)``, containing the vector of knots, the B-spline coefficients, and the degree of the spline (see `splev`). Returns ------- results : {ndarray, list of ndarrays} An array (or a list of arrays) containing all derivatives up to order k inclusive for each point `x`. See Also -------- splprep, splrep, splint, sproot, splev, bisplrep, bisplev, BSpline References ---------- .. [1] C. de Boor: On calculating with b-splines, J. Approximation Theory 6 (1972) 50-62. .. [2] M. G. Cox : The numerical evaluation of b-splines, J. Inst. Maths applics 10 (1972) 134-149. .. [3] P. Dierckx : Curve and surface fitting with splines, Monographs on Numerical Analysis, Oxford University Press, 1993. """ if isinstance(tck, BSpline): raise TypeError("spalde does not accept BSpline instances.") else: return _impl.spalde(x, tck) def insert(x, tck, m=1, per=0): """ Insert knots into a B-spline. Given the knots and coefficients of a B-spline representation, create a new B-spline with a knot inserted `m` times at point `x`. This is a wrapper around the FORTRAN routine insert of FITPACK. Parameters ---------- x (u) : array_like A 1-D point at which to insert a new knot(s). If `tck` was returned from ``splprep``, then the parameter values, u should be given. tck : a `BSpline` instance or a tuple If tuple, then it is expected to be a tuple (t,c,k) containing the vector of knots, the B-spline coefficients, and the degree of the spline. m : int, optional The number of times to insert the given knot (its multiplicity). Default is 1. per : int, optional If non-zero, the input spline is considered periodic. Returns ------- BSpline instance or a tuple A new B-spline with knots t, coefficients c, and degree k. ``t(k+1) <= x <= t(n-k)``, where k is the degree of the spline. In case of a periodic spline (``per != 0``) there must be either at least k interior knots t(j) satisfying ``t(k+1)>> from scipy.interpolate import splrep, splder, sproot >>> x = np.linspace(0, 10, 70) >>> y = np.sin(x) >>> spl = splrep(x, y, k=4) Now, differentiate the spline and find the zeros of the derivative. (NB: `sproot` only works for order 3 splines, so we fit an order 4 spline): >>> dspl = splder(spl) >>> sproot(dspl) / np.pi array([ 0.50000001, 1.5 , 2.49999998]) This agrees well with roots :math:`\\pi/2 + n\\pi` of :math:`\\cos(x) = \\sin'(x)`. """ if isinstance(tck, BSpline): return tck.derivative(n) else: return _impl.splder(tck, n) def splantider(tck, n=1): """ Compute the spline for the antiderivative (integral) of a given spline. Parameters ---------- tck : BSpline instance or a tuple of (t, c, k) Spline whose antiderivative to compute n : int, optional Order of antiderivative to evaluate. Default: 1 Returns ------- BSpline instance or a tuple of (t2, c2, k2) Spline of order k2=k+n representing the antiderivative of the input spline. A tuple is returned iff the input argument `tck` is a tuple, otherwise a BSpline object is constructed and returned. See Also -------- splder, splev, spalde BSpline Notes ----- The `splder` function is the inverse operation of this function. Namely, ``splder(splantider(tck))`` is identical to `tck`, modulo rounding error. .. versionadded:: 0.13.0 Examples -------- >>> from scipy.interpolate import splrep, splder, splantider, splev >>> x = np.linspace(0, np.pi/2, 70) >>> y = 1 / np.sqrt(1 - 0.8*np.sin(x)**2) >>> spl = splrep(x, y) The derivative is the inverse operation of the antiderivative, although some floating point error accumulates: >>> splev(1.7, spl), splev(1.7, splder(splantider(spl))) (array(2.1565429877197317), array(2.1565429877201865)) Antiderivative can be used to evaluate definite integrals: >>> ispl = splantider(spl) >>> splev(np.pi/2, ispl) - splev(0, ispl) 2.2572053588768486 This is indeed an approximation to the complete elliptic integral :math:`K(m) = \\int_0^{\\pi/2} [1 - m\\sin^2 x]^{-1/2} dx`: >>> from scipy.special import ellipk >>> ellipk(0.8) 2.2572053268208538 """ if isinstance(tck, BSpline): return tck.antiderivative(n) else: return _impl.splantider(tck, n)