# Find the longest increasing subsequence in a 2-D array

I have this problem as homework and I really just have no idea where to begin. I have implemented the solution using a recursive algorithm (#1), but I just cannot figure out how to solve the problem using a stack... any assistance would be great.

Find the longest increasing sequence of numbers in a 15 x 15 array. For example, if the array, 4x4, contains

``````97  47  56  36
35  57  41  13
89  36  98  75
25  45  26  17
``````

then the longest increasing sequence of numbers is the sequence of length eight consisting of 17, 26, 36, 41, 47, 56, 57, 97. Note that there are no duplicates in the increasing sequence.

1. Design a recursive algorithm to solve this problem and implement it in Java.

2. Design a non-recursive algorithm to solve the same problem using a stack.

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 I'm unable to see how the array you've shown is 4x4. – Fareesh Vijayarangam Mar 20 '11 at 19:06 @Recursor "I really just have no idea where to begin." Begin here home.earthlink.net/~patricia_shanahan/beginner.html – Andrew Thompson Mar 20 '11 at 19:29 Sorry, I must have messed up the formatting. - updated. – Recursor Mar 20 '11 at 19:44 @Andrew Thompson I may have overstated that I have no idea. I know how to solve the problem, in that I did it recursively, I just do not know how using a stack would help. I realize that it will require going through and using each item as the starting point, then finding the largest subsequence of each starting point. I am really just unsure of how I would use a stack to do this... – Recursor Mar 20 '11 at 19:49 `I have implemented the solution using a recursive algorithm (#1)` - can you show this code? – dantuch Mar 20 '11 at 19:53
 thanks I was thinking something to that effect (tree) but that sounds good as well. Would you say then that the graph would be something like array[x,y] -> all nodes differing by array[x+/-1],[y+/-1] which are > array[x,y], etc.? I just am not sure where my stack comes into play, when I am retrieving the result? – Recursor Mar 21 '11 at 1:03 @Recursor - treat the problem as two parts. 1) Solve the problem with a recursive algorithm. 2) Turn the recursive algorithm into an iterative algorithm, using a `Stack` to hold the state that was held in local variables / parameters in the recursive version. – Stephen C Apr 10 '11 at 3:13