# How to solve this puzzle? [closed]

I recently got a question, given a two dimensional array filled with 0's and 1's how to find if there is a path between points start(p,q) and end(r,s).

``````     0 1 2 3
0 |1 0 0 0 |
1 |0 1 0 1 |
2 |0 1 1 1 |
3 |0 0 0 1 |
``````

In the above array of 4x4, I need to device a generic algorithm to find if there exists a path(not necessarily the best) between (0,0) and (3,3). Here in the example its just diagonal 1's that make a path but i need an algorithm which will find if there exists any path between the two points.

Thanks

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There are lot many path finding algorithms, just create a proper data structure to use them –  P0W Sep 14 '13 at 4:57
A standard way is to use recursion. Each recursive call 0s the current location, tries to find a path from a neighboring 1 to the endpoint, then sets the current location back to 1. If it reaches the endpoint, return true. If a recursive call returns true, return true. If you need the path, then record it in a global array as you go, erasing any false leads. –  UncleO Sep 14 '13 at 5:08
Try looking into Breadth/Depth first search algorithms –  shiraz Sep 14 '13 at 6:13
@UncleO: The Problem with recursion is, if the given array is 100x100 or 1000x1000 then it will take a lot of time and memory. –  pratster Sep 14 '13 at 6:30
@pratster: Recursive algorithms does not use more memory or time inherently. The proposed recursive algorithm does because it is exhaustive, that is, it will explore every single path in the maze. –  rodrigo Sep 14 '13 at 9:47

## closed as off-topic by UmNyobe, Morten Kristensen, nmaier, Flow, sashkelloSep 14 '13 at 13:58

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I think this problem is similar to the Union Find Problem that can be solved using the weighted quick union with path compression in almost (slightly more than) O(N) time. http://algs4.cs.princeton.edu/15uf/

Here N = rows x columns.

You basically traverse each element in the matrix and see if its connected to its neighbours and apply the algorithm accordingly.

EDIT: As Codie CodeMonkey points out, for a sparse matrix, a more efficient algorithm can be used.

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If this is a large sparse matrix, O(N) on the number of elements isn't very good! –  Codie CodeMonkey Sep 14 '13 at 9:25
Yes you are right. But the Op mentions in a comment that the matrix size can be 1000x1000 which means Nmax = 1,000,000. This number I'm sure can be handled easily and quickly on any PC. Moreover, for a dense matrix, any algorithm will have atleast O(N) complexity. –  Abhishek Bansal Sep 14 '13 at 10:06
yes, O(N) complexity, but on the number of 1's in the matrix, not on the total elements in the matrix. If you're finding a path through the 1's, no need to step off the path! –  Codie CodeMonkey Sep 14 '13 at 10:09
Correct! But actually what I mean is (I may be wrong) that if the matrix is dense, and if you check on all the number 1s, then there is a possibility that the cost of keeping track of all the currently active nodes may increase the complexity to more than O(N). –  Abhishek Bansal Sep 14 '13 at 10:21
@CodieCodeMonkey how does the program know if an element is a 1 without checking it? –  גלעד ברקן Sep 14 '13 at 12:26