Let's say I have a set of integers. I want to find the longest increasing subsequence of that set using dynamic programming. This is simply out of practice, reviewing my old notes from my algorithms course, and I don't seem to understand how this works.

OK, I will describe first the simplest solution which is O(N^2), where N is the size of the set. There also exists a O(N log N) solution, which I will describe also. Look here for it at the section Efficient algorithms. I will assume the indices of the array are from 0 to N1. So let's define DP[i] to be the length of the LIS(Longest increasing subsequence) which is ending at element with index i. To compute DP[i] we look at all indices j < i and check both if DP[j] + 1 > DP[i] and array[j] < array[i](we want it to be increasing). If this is true we can update the current optimum for DP[i]. To find the global optimum for the array you can take the maximum value from DP[0..N1].
I use the array OK, now to the more efficient Let Now iterate through every integer
Total runtime  Now let's do a real example: Set of integers:
Steps:
So the length of the LIS is To reconstruct the actual To make things simpler, we can keep in the array That is input[4] = 1, input[5] = 2, input[3] = 4, input[7] = 5, input[8] = 8. If we update properly the parent array, the actual LIS is:
Now to the important thing  how do we update the parent array? There are two options:



Petar Minchev's explanation helped clear things up for me, but it was hard for me to parse what everything was, so I made a Python implementation with overlydescriptive variable names and lots of comments. I did a naive recursive solution, the O(n^2) solution, and the O(n log n) solution. I hope it helps clear up the algorithms! The Recursive Solution
The O(n^2) Dynamic Programming Solution
The O(n log n) Dynamic Programming Solution



The following C++ implementation includes also some code that builds the actual longest increasing subsequence using an array called



Here are three steps of evaluating the problem from dynamic programming point of view:
If we take as an example sequence {0, 8, 2, 3, 7, 9}, at index:
Here's the working C++11 code:



Here is a Scala implementation of the O(n^2) algorithm:



Here's another O(n^2) JAVA implementation. No recursion/memoization to generate the actual subsequence. Just a string array that stores the actual LIS at every stage and an array to store the length of the LIS for each element. Pretty darn easy. Have a look:
Code in action: http://ideone.com/sBiOQx 


here is java O(nlogn) implementation



This is a Java implementation in O(n^2). I just did not use Binary Search to find the smallest element in S, which is >= than X. I just used a for loop. Using Binary Search would make the complexity at O(n logn)



This can be solved in O(n^2) using Dynamic Programming. Python code for the same would be like:
For input: output would be: The list_index of output list is the list_index of input list. The value at a given list_index in output list denotes the Longest increasing subsequence length for that list_index. 


protected by Community♦ Dec 21 '11 at 14:14
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