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# -*- coding: utf-8 -*-
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"""
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A set of convenient utilities for numerical work.
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Most of this module requires Numerical Python or is meant to be used with it.
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See http://www.pfdubois.com/numpy for details.
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$Id: numutils.py 958 2005-12-27 23:17:51Z fperez $"""
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#*****************************************************************************
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# Copyright (C) 2001-2005 Fernando Perez <fperez@colorado.edu>
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#
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# Distributed under the terms of the BSD License. The full license is in
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# the file COPYING, distributed as part of this software.
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#*****************************************************************************
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from IPython import Release
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__author__ = '%s <%s>' % Release.authors['Fernando']
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__license__ = Release.license
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__all__ = ['sum_flat','mean_flat','rms_flat','base_repr','binary_repr',
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'amin','amax','amap','zeros_like','empty_like',
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'frange','diagonal_matrix','identity',
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'fromfunction_kw','log2','ispower2',
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'norm','l1norm','l2norm','exp_safe',
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'inf','infty','Infinity',
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'Numeric']
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#****************************************************************************
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# required modules
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import __main__
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import math
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import operator
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import sys
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import Numeric
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from Numeric import *
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#*****************************************************************************
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# Globals
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# useful for testing infinities in results of array divisions (which don't
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# raise an exception)
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# Python, LaTeX and Mathematica names.
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inf = infty = Infinity = (array([1])/0.0)[0]
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#****************************************************************************
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# function definitions
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exp_safe_MIN = math.log(2.2250738585072014e-308)
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exp_safe_MAX = 1.7976931348623157e+308
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def exp_safe(x):
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"""Compute exponentials which safely underflow to zero.
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Slow but convenient to use. Note that NumArray will introduce proper
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floating point exception handling with access to the underlying
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hardware."""
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if type(x) is ArrayType:
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return exp(clip(x,exp_safe_MIN,exp_safe_MAX))
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else:
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return math.exp(x)
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def amap(fn,*args):
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"""amap(function, sequence[, sequence, ...]) -> array.
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Works like map(), but it returns an array. This is just a convenient
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shorthand for Numeric.array(map(...))"""
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return array(map(fn,*args))
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def amin(m,axis=0):
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"""amin(m,axis=0) returns the minimum of m along dimension axis.
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"""
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return minimum.reduce(asarray(m),axis)
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def amax(m,axis=0):
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"""amax(m,axis=0) returns the maximum of m along dimension axis.
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"""
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return maximum.reduce(asarray(m),axis)
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def zeros_like(a):
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"""Return an array of zeros of the shape and typecode of a.
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If you don't explicitly need the array to be zeroed, you should instead
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use empty_like(), which is faster as it only allocates memory."""
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return zeros(a.shape,a.typecode())
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def empty_like(a):
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"""Return an empty (uninitialized) array of the shape and typecode of a.
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Note that this does NOT initialize the returned array. If you require
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your array to be initialized, you should use zeros_like().
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This requires Numeric.empty(), which appeared in Numeric 23.7."""
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return empty(a.shape,a.typecode())
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def sum_flat(a):
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"""Return the sum of all the elements of a, flattened out.
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It uses a.flat, and if a is not contiguous, a call to ravel(a) is made."""
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if a.iscontiguous():
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return Numeric.sum(a.flat)
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else:
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return Numeric.sum(ravel(a))
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def mean_flat(a):
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"""Return the mean of all the elements of a, flattened out."""
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return sum_flat(a)/float(size(a))
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def rms_flat(a):
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"""Return the root mean square of all the elements of a, flattened out."""
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return math.sqrt(sum_flat(absolute(a)**2)/float(size(a)))
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def l1norm(a):
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"""Return the l1 norm of a, flattened out.
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Implemented as a separate function (not a call to norm() for speed).
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Ref: http://mathworld.wolfram.com/L1-Norm.html"""
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return sum_flat(absolute(a))
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def l2norm(a):
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"""Return the l2 norm of a, flattened out.
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Implemented as a separate function (not a call to norm() for speed).
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Ref: http://mathworld.wolfram.com/L2-Norm.html"""
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return math.sqrt(sum_flat(absolute(a)**2))
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def norm(a,p=2):
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"""norm(a,p=2) -> l-p norm of a.flat
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Return the l-p norm of a, considered as a flat array. This is NOT a true
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matrix norm, since arrays of arbitrary rank are always flattened.
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p can be a number or one of the strings ('inf','Infinity') to get the
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L-infinity norm.
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Ref: http://mathworld.wolfram.com/VectorNorm.html
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http://mathworld.wolfram.com/L-Infinity-Norm.html"""
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if p in ('inf','Infinity'):
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return max(absolute(a).flat)
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else:
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return (sum_flat(absolute(a)**p))**(1.0/p)
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def frange(xini,xfin=None,delta=None,**kw):
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"""frange([start,] stop[, step, keywords]) -> array of floats
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Return a Numeric array() containing a progression of floats. Similar to
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arange(), but defaults to a closed interval.
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frange(x0, x1) returns [x0, x0+1, x0+2, ..., x1]; start defaults to 0, and
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the endpoint *is included*. This behavior is different from that of
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range() and arange(). This is deliberate, since frange will probably be
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more useful for generating lists of points for function evaluation, and
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endpoints are often desired in this use. The usual behavior of range() can
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be obtained by setting the keyword 'closed=0', in this case frange()
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basically becomes arange().
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When step is given, it specifies the increment (or decrement). All
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arguments can be floating point numbers.
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frange(x0,x1,d) returns [x0,x0+d,x0+2d,...,xfin] where xfin<=x1.
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frange can also be called with the keyword 'npts'. This sets the number of
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points the list should contain (and overrides the value 'step' might have
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been given). arange() doesn't offer this option.
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Examples:
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>>> frange(3)
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array([ 0., 1., 2., 3.])
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>>> frange(3,closed=0)
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array([ 0., 1., 2.])
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>>> frange(1,6,2)
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array([1, 3, 5])
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>>> frange(1,6.5,npts=5)
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array([ 1. , 2.375, 3.75 , 5.125, 6.5 ])
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"""
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#defaults
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kw.setdefault('closed',1)
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endpoint = kw['closed'] != 0
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# funny logic to allow the *first* argument to be optional (like range())
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# This was modified with a simpler version from a similar frange() found
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# at http://aspn.activestate.com/ASPN/Cookbook/Python/Recipe/66472
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if xfin == None:
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xfin = xini + 0.0
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xini = 0.0
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if delta == None:
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delta = 1.0
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# compute # of points, spacing and return final list
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try:
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npts=kw['npts']
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delta=(xfin-xini)/float(npts-endpoint)
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except KeyError:
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# round() gets npts right even with the vagaries of floating point.
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npts=int(round((xfin-xini)/delta+endpoint))
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return arange(npts)*delta+xini
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def diagonal_matrix(diag):
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"""Return square diagonal matrix whose non-zero elements are given by the
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input array."""
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return diag*identity(len(diag))
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def identity(n,rank=2,typecode='l'):
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"""identity(n,r) returns the identity matrix of shape (n,n,...,n) (rank r).
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For ranks higher than 2, this object is simply a multi-index Kronecker
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delta:
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/ 1 if i0=i1=...=iR,
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id[i0,i1,...,iR] = -|
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\ 0 otherwise.
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Optionally a typecode may be given (it defaults to 'l').
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Since rank defaults to 2, this function behaves in the default case (when
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only n is given) like the Numeric identity function."""
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iden = zeros((n,)*rank,typecode=typecode)
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for i in range(n):
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idx = (i,)*rank
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iden[idx] = 1
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return iden
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def base_repr (number, base = 2, padding = 0):
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"""Return the representation of a number in any given base."""
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chars = '0123456789ABCDEFGHIJKLMNOPQRSTUVWXYZ'
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if number < base: \
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return (padding - 1) * chars [0] + chars [int (number)]
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max_exponent = int (math.log (number)/math.log (base))
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max_power = long (base) ** max_exponent
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lead_digit = int (number/max_power)
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return chars [lead_digit] + \
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base_repr (number - max_power * lead_digit, base, \
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max (padding - 1, max_exponent))
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def binary_repr(number, max_length = 1025):
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"""Return the binary representation of the input number as a string.
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This is more efficient than using base_repr with base 2.
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Increase the value of max_length for very large numbers. Note that on
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32-bit machines, 2**1023 is the largest integer power of 2 which can be
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converted to a Python float."""
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assert number < 2L << max_length
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shifts = map (operator.rshift, max_length * [number], \
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range (max_length - 1, -1, -1))
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digits = map (operator.mod, shifts, max_length * [2])
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if not digits.count (1): return 0
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digits = digits [digits.index (1):]
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return ''.join (map (repr, digits)).replace('L','')
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def log2(x,ln2 = math.log(2.0)):
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"""Return the log(x) in base 2.
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This is a _slow_ function but which is guaranteed to return the correct
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integer value if the input is an ineger exact power of 2."""
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try:
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bin_n = binary_repr(x)[1:]
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except (AssertionError,TypeError):
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return math.log(x)/ln2
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else:
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if '1' in bin_n:
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return math.log(x)/ln2
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else:
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return len(bin_n)
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def ispower2(n):
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"""Returns the log base 2 of n if n is a power of 2, zero otherwise.
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Note the potential ambiguity if n==1: 2**0==1, interpret accordingly."""
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bin_n = binary_repr(n)[1:]
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if '1' in bin_n:
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return 0
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else:
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return len(bin_n)
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def fromfunction_kw(function, dimensions, **kwargs):
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"""Drop-in replacement for fromfunction() from Numerical Python.
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Allows passing keyword arguments to the desired function.
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Call it as (keywords are optional):
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fromfunction_kw(MyFunction, dimensions, keywords)
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The function MyFunction() is responsible for handling the dictionary of
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keywords it will recieve."""
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return function(tuple(indices(dimensions)),**kwargs)
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#**************************** end file <numutils.py> ************************
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