This is a Python 3 package to solve exact cover problems using Numpy. It is based on https://github.com/moygit/exact_cover_np by Moy Easwaran. Jack Grahl ported it to Python 3, fixed some bugs and made lots of small improvements to the packaging.
The original package by Moy was designed to solve sudoku. Now this package is only designed to solve exact cover problems given as boolean arrays. It can be used to solve sudoku and a variety of combinatorial problems. However the code to reduce a sudoku to an exact cover problem is no longer part of this project. It can be found at:
Another project, 'polyomino' by Jack Grahl uses this algorithm to solve polyomino tiling problems. It can be found at:
The exact cover problem is as follows: given a set X and a collection S of subsets of X, we want to find a subcollection S* of S that is an exact cover or partition of X. In other words, S* is a bunch of subsets of X whose union is X, and which have empty intersection with each other. (Example below; more details on wikipedia.)
This NumPy module uses Donald Knuth's Algorithm X to find exact covers of sets. For details on Algorithm X please see either the Wikipedia page or Knuth's paper. Specifically, we use the Knuth/Hitotsumatsu/Noshita method of Dancing Links for efficient backtracking. Please see Knuth's paper for details.
Suppose X = {0,1,2,3,4}, and suppose S = {A,B,C,D}, where
A = {0, 3}
B = {0, 1, 2}
C = {1, 2}
D = {4}.
Here we can just eyeball these sets and conclude that S* = {A,C,D} forms an exact cover: each element of X is in one of these sets (i.e. is "covered" by one of these sets), and no element of X is in more than one.
We'd use exact_cover
to solve the problem as follows:
using 1 to denote that a particular member of X is in a subset and 0 to
denote that it's not, we can represent the sets as
A = 1,0,0,1,0 # The 0th and 3rd entries are 1 since 0 and 3 are in A; the rest are 0.
B = 1,1,1,0,0 # The 0th, 1st, and 2nd entries are 1, and the rest are 0,
C = 0,1,1,0,0 # etc.
D = 0,0,0,0,1
Now we can call exact_cover
:
>>> import numpy as np
>>> import exact_cover as ec
>>> S = np.array([[1,0,0,1,0],[1,1,1,0,0],[0,1,1,0,0],[0,0,0,0,1]], dtype='int32')
>>> ec.get_exact_cover(S)
array([0, 2, 3])
This is telling us that the 0th row (i.e. A), the 2nd row (i.e. C), and the 3rd row (i.e. D) together form an exact cover.
The NumPy module (exact_cover
) is implemented in four pieces:
- The lowest level is
quad_linked_list
, which implements a circular linked-list with left-, right-, up-, and down-links. - This is used in
sparse_matrix
to implement the type of sparse representation of matrices that Knuth describes in his paper (in brief, each column contains all its non-zero entries, and each non-zero cell also points to the (horizontally) next non-zero cell in either direction). - Sparse matrices are used in
dlx
to implement Knuth's Dancing Links version of his Algorithm X, which calculates exact covers. exact_cover
provides the glue code letting us invokedlx
on NumPy arrays.
- build/ The location where files are built.
- dist/ The location for fully prepared files.
- exact_cover/ The build tool 'poetry', seems to need this folder with a dummy python file so it doesn't worry about there not being any package.
- obj/ Where the compiled C code is going to be output.
- src/ The C sources.
- tests/ Tests for both the Python package and the C code.
- tools/ Code used in analysing and working with the library. This is not distributed with the package.
Thanks very much to Moy Easwaran (https://github.com/moygit) for his inspiring work!