I'm trying to write a Python script to determine if a given nonogram is unique. My current script just takes way too long to run so I was wondering if anyone had any ideas.
I understand that the general nonogram problem is NP-hard. However, I know two pieces of information about my given nonograms:
- When representing the black/white boxes as 0s and 1s, respectively, I know how many of each I have.
- I'm only considering 6x6 nonograms.
I initially used a brute force approach (so 2^36 cases). Knowing (1), however, I was able to narrow it down to n-choose-k (36-choose-number of zeroes) cases. However, when k is near 18, this is still ~2^33 cases. Takes days to run.
Any ideas how I might speed this up? Is it even possible?
Again, I don't care what the solution is -- I already have it. What I'm trying to determine is if that solution is unique.
EDIT: This isn't exactly the full code but has the general idea:
def unique(nonogram): found = 0 # create all combinations with the same number of 1s and 0s as incoming nonogram for entry in itertools.combinations(range(len(nonogram)), nonogram.count(1)): blank = *len(nonogram) # initialize blank nonogram for element in entry: blank[element] = 1 # distribute 1s across nonogram rows = find_rows(blank) # create row headers (like '2 1') cols = find_cols(blank) if rows == nonogram_rows and cols == nonogram_cols: found += 1 # row and col headers same as original nonogram if found > 1: break # obviously not unique if found == 1: print('Unique nonogram')