Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I need to set up a 2 dimensional space (for all practical purposes, a 2-D array) of paths.. Every index [y][x] contains a path..such as

+--  --+   +--  --+
|  ||  |   |  ||  |
|  | ==     ==++== 
|  ||  |   |      |
+--  --+   +------+

While I can initialize this space randomly, I want to be able to generate a sequence of paths that ensures that every coordinate can be reached from every other coordinate.

What algorithm should I be looking at to solve this?

I've learnt many path finding algorithms such as Dijkstra’s or A*, but I don't think these are usable for my problem.

share|improve this question
brute force method is to solve the maze like a kid. start at the opening and draw a line to every area without lifting the pen. if there's any unpainted areas after you exhausted all the path possibilities, you've got an unreachable area. –  Marc B Apr 23 '13 at 16:59
I was looking for any approach better than brute force. Brute force I think will work out to be O(n^2) –  user1761555 Apr 23 '13 at 17:00
You want a maze generation algorithm? Well, there you go. –  Dukeling Apr 23 '13 at 17:18
Can you explain what's going on in that image? Also, "Every index [y][x] contains a path" - each cell contains an entire path? –  Dukeling Apr 23 '13 at 17:26
Those are individual cells, they have paths in the form of a T or a horizontal T. –  Mariano Apr 23 '13 at 17:36

1 Answer 1

The problem you have is essentially equivalent to finding a spanning tree, which can be done in O(n) using either Depth-First Search or Breadth-First Search.

Hint: Note that if A is reachable from B and B is reachable from C, then A is reachable from C (transitivity); also as long as you don't have one way corridor then if A is reachable from B then B is also reachable from A (reflexivity).

For generating maze, once you generated a span, then you may start adding extra edges to add some variation (though extra edges usually makes the maze easier to solve). The span guarantees the connectivity.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.