Metadata-Version: 1.1
Name: justbases
Version: 0.5
Summary: conversion of ints and rationals to any base
Home-page: UNKNOWN
Author: Anne Mulhern
Author-email: mulhern@cs.wisc.edu
License: GPL 2+
Description: Justbases
        =========
        
        Purpose
        -------
        Conversion of a rational number to a representation in any base. Any
        rational number can be represented as a repeating sequence in any base.
        Any integer is representable as a terminating sequence in any base.
        
        Motivation
        ----------
        This facility does not seem to exist in standard Python numerical packages
        or standard Python symbolic computation packages. Most likely that is
        because it falls between the two, as it is precise numerical computation,
        but involves a symbolic component, the possibly repeating sequence of
        digits.
        
        Algorithmic Complexity
        ----------------------
        The complexity of operations that perform division in an arbitrary base
        can be quite high. Most methods are annotated with an estimate of their
        expected complexity in terms of the number of Python operations that they
        make use of. No differentiation is made among different Python operations.
        With respect to division in an arbitrary base, the complexity is bounded
        by the value of the divisor, unless a precision limit is set.
        
        
Platform: Linux
Classifier: Development Status :: 2 - Pre-Alpha
Classifier: Intended Audience :: Developers
Classifier: License :: OSI Approved :: GNU General Public License (GPL)
Classifier: Operating System :: POSIX :: Linux
Classifier: Programming Language :: Python
Classifier: Programming Language :: Python :: 2
Classifier: Programming Language :: Python :: 3
Classifier: Programming Language :: Python :: Implementation :: CPython
Classifier: Programming Language :: Python :: Implementation :: PyPy
Classifier: Topic :: Software Development :: Libraries
Classifier: Topic :: Scientific/Engineering :: Mathematics
