A demo on how to solve a Sudoku puzzle with D-Wave Ocean.
python sudoku.py <sudoku file path>
For example,
python sudoku.py problem.txt
The idea is to describe the Sudoku puzzle as a set of constraints that our solution needs to satisfy (i.e. we are posing the puzzle as a constraint satisfaction problem). By laying down these constraints, we can get our solver to optimize over them and hopefully return a solution that satisfies all our constraints.
There are several constraints in Sudoku:
- Each cell in the Sudoku array must contain one digit
- No row may have duplicate digits
- No column may have duplicate digits
- No sub-square may have duplicate digits
The code takes as its input a text file containing a Sudoku puzzle in the following format:
- Rows of the puzzle are represented as a sequence of lines, one per row
- Cells in each row of the puzzle are represented as space-separated integers
- Empty cells are represented by zeros
- The file should not contain any additional lines (e.g. headers) or comments
For example,
8 2 0 9 1 0 0 0 7
9 0 0 7 0 6 8 1 2
0 1 7 8 0 0 0 9 0
0 8 0 0 0 0 9 7 0
0 5 2 0 9 3 1 8 0
6 0 0 1 8 7 0 0 0
0 7 8 0 0 9 0 5 0
3 0 0 2 5 0 7 6 0
5 0 9 3 0 1 2 0 8
-
A Sudoku puzzle with
nbyncells requires that each row, column, and sub-square havenunique values. Since the sub-square is a square matrix withnitems, it means thatnmust be a square number (i.e. for a sub-square of sizembym,m * m = n). Hence in the code, the variablesnandmrepresent:n == number of rows == number of columns m == sqrt(n) == number of sub-square rows == number of sub-square columns
- We are using a hybrid solver called Kerberos (specifically,
hybrid.reference.KerberosSampler). It is a hybrid solver because it combines classical and quantum resources together - We are using Kerberos because it can break down our problem into smaller chunks that could then be solved by our quantum computer. The quantum and classical solutions are then combined together, resulting in our final solution
Released under the Apache License 2.0. See LICENSE file.