# Algorithmic solution to Minesweeper

I am trying to make the minesweeper solver. As you know there are 2 ways to determine which fields in minefield are safe to open, or to determine which fields are mined and you need to flag it. First way to determine is trivial and we have something like this:

if (number of mines around X – current number of discovered mines around X) = number of unopened fields around X then All unopened fields around X are mined

if (number of mines around X == current number of discovered mines around X) then All unopened fields around X are NOT mined

But my question is: What about situation when we can't find any mined or safe field and we need to look at more than 1 field?

For example this situation. We can't determine anything using previous method. So i need a help with algorithm for these cases.

I have to use A* algorithm to make this. That is why i need all possible safe states for next step in algorithm. When i find all possible safe states i will add them to the current shortest path and depending on heuristic function i will sort list of paths and choose next field that needs to be opened.

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You could avoid writing the algorithm and let the computer learn by itself, but I can't tell you any futher.. :/ –  BlackBear Apr 11 '13 at 19:29
I don't understand the example image you provide. The leftmost "2" suggests both the fields in the second row on the left are mined, but the second "2" suggests only one of them is. In what game context would this arise? Are you imagining that the game's information might be contradictory? –  pjmorse Apr 11 '13 at 19:30
But you can find a safe field in that image, using your algorithm. Take the 2 surrounded by the two ones; the number of mines around the two equals the current number of discovered mines around the two. So you may uncover the blank field above it. Or, do you mean, if you had that field with no flags yet marked, how would you know to mark those two flags? –  Kevin Apr 11 '13 at 19:38
There are more unopened fields on left and right side. Add one column with unopened fields on left and one on right side and you will understand. –  user216799 Apr 11 '13 at 19:40
I don't think you'll find a small set of rules to cover every situation, because the set of covered tiles that border an uncovered tile intersects with the set of tiles bordered by the next uncovered tile, and so on. You might have to reason through a long chain of overlapping tiles in order to make the right moves without guessing. In general, this is a job for a constraint solver, which is not trivial to implement from scratch. –  mbeckish Apr 11 '13 at 19:54

Awesome problem, before you get too excited though, please read NP Completeness and Minesweeper, as well as the accompanying presentation which develops some good worst case examples and how a human might solve them. Nevertheless, in expectation we most likely won't hit a time barrier, if we use basic pruning and heuristics.

The question of generating the game is asked here: Minesweeper solving algorithm. There is a very cool post on algebraic methods. You can also give backtracking a try (i.e. take a guess and see if that invalidates things), similar to the case where local information is not enough for something like sudoku. See this great discussion about this technique.

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If you are allowed to back up from your mistakes, then you could just uncover every square once, and keep track of which squares have mines. I think maybe the OP is looking for a solver that follows the same rules as a human - namely that you fail if you make one wrong move. –  mbeckish Apr 11 '13 at 19:47
Yes, of course, use backtracking when all else fails otherwise clearly the tree grows exponentially. –  anil Apr 11 '13 at 19:48
But how can you backtrack without uncovering a mine and losing the game? –  mbeckish Apr 11 '13 at 19:55
Sorry, let me clarify. Backtracking means pretending to click a square (this will not reveal any new squares of course since it is hypothetical). Now think about how the values on other squares change, assuming what you clicked was not a mine. If there is a square that becomes < 1, then clearly there is a contradiction in the configuration, and the current configuration is not possible, so there must have been a mine somewhere along the path of hypothetically clicked squares. –  anil Apr 11 '13 at 19:57
My fault - I see what you are saying now. –  mbeckish Apr 11 '13 at 20:00