In 2019, a team of researchers and cubers developed a new algorithm for solving the NxNxN Rubik's Cube. The algorithm, called "NxNxN-Rubik", uses a combination of mathematical techniques, including group theory and combinatorial optimization. The algorithm is capable of solving cubes of any size, from 3x3x3 to larger sizes like 5x5x5 or even 10x10x10.
# Example usage: cube = np.array([ [[1, 1, 1], [2, 2, 2], [3, 3, 3]], [[4, 4, 4], [5, 5, 5], [6, 6, 6]], [[7, 7, 7], [8, 8, 8], [9, 9, 9]] ])
def generate_permutations(groups): # Generate permutations of the groups permutations = [] for group in groups.values(): permutation = np.permutation(group) permutations.append(permutation) return permutations
The NxNxN Rubik's Cube is a challenging puzzle that requires advanced algorithms and techniques. The NxNxN-Rubik algorithm, implemented in Python and available on GitHub, provides a efficient solution to the problem. The algorithm's stages, including exploration, grouping, permutation, and optimization, work together to find a minimal solution. The Python implementation provides a readable and maintainable code base, making it easy to modify and extend. Whether you're a seasoned cuber or just starting out, the NxNxN-Rubik algorithm is a powerful tool for solving larger Rubik's Cubes.
solution = solve_cube(cube) print(solution) This implementation defines the explore_cube , group_pieces , generate_permutations , and optimize_solution functions, which are used to solve the cube.