"""rbf - Radial basis functions for interpolation/smoothing scattered Nd data.
Written by John Travers <jtravs@gmail.com>, February 2007
Based closely on Matlab code by Alex Chirokov
Additional, large, improvements by Robert Hetland
Some additional alterations by Travis Oliphant
Permission to use, modify, and distribute this software is given under the
terms of the SciPy (BSD style) license. See LICENSE.txt that came with
this distribution for specifics.
NO WARRANTY IS EXPRESSED OR IMPLIED. USE AT YOUR OWN RISK.
Copyright (c) 2006-2007, Robert Hetland <hetland@tamu.edu>
Copyright (c) 2007, John Travers <jtravs@gmail.com>
Redistribution and use in source and binary forms, with or without
modification, are permitted provided that the following conditions are
met:
* Redistributions of source code must retain the above copyright
notice, this list of conditions and the following disclaimer.
* Redistributions in binary form must reproduce the above
copyright notice, this list of conditions and the following
disclaimer in the documentation and/or other materials provided
with the distribution.
* Neither the name of Robert Hetland nor the names of any
contributors may be used to endorse or promote products derived
from this software without specific prior written permission.
THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS
"AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT
LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR
A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT
OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT
LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
(INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
"""
from __future__ import division, print_function, absolute_import
import sys
from numpy import (sqrt, log, asarray, newaxis, all, dot, exp, eye,
float_)
from scipy import linalg
from scipy.lib.six import callable, get_method_function, \
get_function_code
__all__ = ['Rbf']
class Rbf(object):
"""
Rbf(*args)
A class for radial basis function approximation/interpolation of
n-dimensional scattered data.
Parameters
----------
*args : arrays
x, y, z, ..., d, where x, y, z, ... are the coordinates of the nodes
and d is the array of values at the nodes
function : str or callable, optional
The radial basis function, based on the radius, r, given by the norm
(default is Euclidean distance); the default is 'multiquadric'::
'multiquadric': sqrt((r/self.epsilon)**2 + 1)
'inverse': 1.0/sqrt((r/self.epsilon)**2 + 1)
'gaussian': exp(-(r/self.epsilon)**2)
'linear': r
'cubic': r**3
'quintic': r**5
'thin_plate': r**2 * log(r)
If callable, then it must take 2 arguments (self, r). The epsilon
parameter will be available as self.epsilon. Other keyword
arguments passed in will be available as well.
epsilon : float, optional
Adjustable constant for gaussian or multiquadrics functions
- defaults to approximate average distance between nodes (which is
a good start).
smooth : float, optional
Values greater than zero increase the smoothness of the
approximation. 0 is for interpolation (default), the function will
always go through the nodal points in this case.
norm : callable, optional
A function that returns the 'distance' between two points, with
inputs as arrays of positions (x, y, z, ...), and an output as an
array of distance. E.g, the default::
def euclidean_norm(x1, x2):
return sqrt( ((x1 - x2)**2).sum(axis=0) )
which is called with x1=x1[ndims,newaxis,:] and
x2=x2[ndims,:,newaxis] such that the result is a matrix of the
distances from each point in x1 to each point in x2.
Examples
--------
>>> rbfi = Rbf(x, y, z, d) # radial basis function interpolator instance
>>> di = rbfi(xi, yi, zi) # interpolated values
"""
def _euclidean_norm(self, x1, x2):
return sqrt(((x1 - x2)**2).sum(axis=0))
def _h_multiquadric(self, r):
return sqrt((1.0/self.epsilon*r)**2 + 1)
def _h_inverse_multiquadric(self, r):
return 1.0/sqrt((1.0/self.epsilon*r)**2 + 1)
def _h_gaussian(self, r):
return exp(-(1.0/self.epsilon*r)**2)
def _h_linear(self, r):
return r
def _h_cubic(self, r):
return r**3
def _h_quintic(self, r):
return r**5
def _h_thin_plate(self, r):
result = r**2 * log(r)
result[r == 0] = 0 # the spline is zero at zero
return result
# Setup self._function and do smoke test on initial r
def _init_function(self, r):
if isinstance(self.function, str):
self.function = self.function.lower()
_mapped = {'inverse': 'inverse_multiquadric',
'inverse multiquadric': 'inverse_multiquadric',
'thin-plate': 'thin_plate'}
if self.function in _mapped:
self.function = _mapped[self.function]
func_name = "_h_" + self.function
if hasattr(self, func_name):
self._function = getattr(self, func_name)
else:
functionlist = [x[3:] for x in dir(self) if x.startswith('_h_')]
raise ValueError("function must be a callable or one of " +
", ".join(functionlist))
self._function = getattr(self, "_h_"+self.function)
elif callable(self.function):
allow_one = False
if hasattr(self.function, 'func_code') or \
hasattr(self.function, '__code__'):
val = self.function
allow_one = True
elif hasattr(self.function, "im_func"):
val = get_method_function(self.function)
elif hasattr(self.function, "__call__"):
val = get_method_function(self.function.__call__)
else:
raise ValueError("Cannot determine number of arguments to function")
argcount = get_function_code(val).co_argcount
if allow_one and argcount == 1:
self._function = self.function
elif argcount == 2:
if sys.version_info[0] >= 3:
self._function = self.function.__get__(self, Rbf)
else:
import new
self._function = new.instancemethod(self.function, self,
Rbf)
else:
raise ValueError("Function argument must take 1 or 2 arguments.")
a0 = self._function(r)
if a0.shape != r.shape:
raise ValueError("Callable must take array and return array of the same shape")
return a0
def __init__(self, *args, **kwargs):
self.xi = asarray([asarray(a, dtype=float_).flatten()
for a in args[:-1]])
self.N = self.xi.shape[-1]
self.di = asarray(args[-1]).flatten()
if not all([x.size == self.di.size for x in self.xi]):
raise ValueError("All arrays must be equal length.")
self.norm = kwargs.pop('norm', self._euclidean_norm)
r = self._call_norm(self.xi, self.xi)
self.epsilon = kwargs.pop('epsilon', None)
if self.epsilon is None:
self.epsilon = r.mean()
self.smooth = kwargs.pop('smooth', 0.0)
self.function = kwargs.pop('function', 'multiquadric')
# attach anything left in kwargs to self
# for use by any user-callable function or
# to save on the object returned.
for item, value in kwargs.items():
setattr(self, item, value)
self.A = self._init_function(r) - eye(self.N)*self.smooth
self.nodes = linalg.solve(self.A, self.di)
def _call_norm(self, x1, x2):
if len(x1.shape) == 1:
x1 = x1[newaxis, :]
if len(x2.shape) == 1:
x2 = x2[newaxis, :]
x1 = x1[..., :, newaxis]
x2 = x2[..., newaxis, :]
return self.norm(x1, x2)
def __call__(self, *args):
args = [asarray(x) for x in args]
if not all([x.shape == y.shape for x in args for y in args]):
raise ValueError("Array lengths must be equal")
shp = args[0].shape
self.xa = asarray([a.flatten() for a in args], dtype=float_)
r = self._call_norm(self.xa, self.xi)
return dot(self._function(r), self.nodes).reshape(shp)