# Copyright 2018-2020 by Christopher C. Little.
# This file is part of Abydos.
#
# Abydos is free software: you can redistribute it and/or modify
# it under the terms of the GNU General Public License as published by
# the Free Software Foundation, either version 3 of the License, or
# (at your option) any later version.
#
# Abydos is distributed in the hope that it will be useful,
# but WITHOUT ANY WARRANTY; without even the implied warranty of
# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
# GNU General Public License for more details.
#
# You should have received a copy of the GNU General Public License
# along with Abydos. If not, see <http://www.gnu.org/licenses/>.
"""abydos.distance._batagelj_bren.
Batagelj & Bren distance
"""
from ._token_distance import _TokenDistance
__all__ = ['BatageljBren']
[docs]class BatageljBren(_TokenDistance):
r"""Batagelj & Bren distance.
For two sets X and Y and a population N, the Batagelj & Bren
distance :cite:`Batagelj:1995`, Batagelj & Bren's :math:`Q_0`, is
.. math::
dist_{BatageljBren}(X, Y) =
\frac{|X \setminus Y| \cdot |Y \setminus X|}
{|X \cap Y| \cdot |(N \setminus X) \setminus Y|}
In :ref:`2x2 confusion table terms <confusion_table>`, where a+b+c+d=n,
this is
.. math::
dist_{BatageljBren} =
\frac{bc}{ad}
.. versionadded:: 0.4.0
"""
def __init__(
self,
alphabet=None,
tokenizer=None,
intersection_type='crisp',
**kwargs
):
"""Initialize BatageljBren instance.
Parameters
----------
alphabet : Counter, collection, int, or None
This represents the alphabet of possible tokens.
See :ref:`alphabet <alphabet>` description in
:py:class:`_TokenDistance` for details.
tokenizer : _Tokenizer
A tokenizer instance from the :py:mod:`abydos.tokenizer` package
intersection_type : str
Specifies the intersection type, and set type as a result:
See :ref:`intersection_type <intersection_type>` description in
:py:class:`_TokenDistance` for details.
**kwargs
Arbitrary keyword arguments
Other Parameters
----------------
qval : int
The length of each q-gram. Using this parameter and tokenizer=None
will cause the instance to use the QGram tokenizer with this
q value.
metric : _Distance
A string distance measure class for use in the ``soft`` and
``fuzzy`` variants.
threshold : float
A threshold value, similarities above which are counted as
members of the intersection for the ``fuzzy`` variant.
.. versionadded:: 0.4.0
"""
super(BatageljBren, self).__init__(
alphabet=alphabet,
tokenizer=tokenizer,
intersection_type=intersection_type,
**kwargs
)
[docs] def dist_abs(self, src, tar):
"""Return the Batagelj & Bren distance of two strings.
Parameters
----------
src : str
Source string (or QGrams/Counter objects) for comparison
tar : str
Target string (or QGrams/Counter objects) for comparison
Returns
-------
float
Batagelj & Bren distance
Examples
--------
>>> cmp = BatageljBren()
>>> cmp.dist_abs('cat', 'hat')
0.002570694087403599
>>> cmp.dist_abs('Niall', 'Neil')
0.007741935483870968
>>> cmp.dist_abs('aluminum', 'Catalan')
0.07282184655396619
>>> cmp.dist_abs('ATCG', 'TAGC')
inf
.. versionadded:: 0.4.0
"""
if src == tar:
return 0.0
self._tokenize(src, tar)
a = self._intersection_card()
b = self._src_only_card()
c = self._tar_only_card()
d = self._total_complement_card()
if a == 0 or d == 0:
return float('inf')
return b * c / (a * d)
[docs] def dist(self, src, tar):
"""Return the normalized Batagelj & Bren distance of two strings.
Parameters
----------
src : str
Source string (or QGrams/Counter objects) for comparison
tar : str
Target string (or QGrams/Counter objects) for comparison
Returns
-------
float
Normalized Batagelj & Bren distance
Examples
--------
>>> cmp = BatageljBren()
>>> cmp.dist('cat', 'hat')
3.2789465400556106e-06
>>> cmp.dist('Niall', 'Neil')
9.874917709019092e-06
>>> cmp.dist('aluminum', 'Catalan')
9.276668350823718e-05
>>> cmp.dist('ATCG', 'TAGC')
1.0
.. versionadded:: 0.4.0
"""
if src == tar:
return 0.0
self._tokenize(src, tar)
a = self._intersection_card()
b = self._src_only_card()
c = self._tar_only_card()
d = self._total_complement_card()
if a == 0 or d == 0:
return 1.0
return (b * c / (a * d)) / (a + b + c + d)
if __name__ == '__main__':
import doctest
doctest.testmod()