# Algorithm explanation for common strings

The Problem definition:
``` Given two strings a and b of equal length, what’s the longest string (S) that can be constructed such that S is a child to both a and b. String x is said to be a child of string y if x can be formed by deleting 0 or more characters from y ```

``` Input format```

``` ```

```Two strings a and b with a newline separating them ```
``` Constraints```

``` ```

`All characters are upper-cased and lie between ascii values 65-90 The maximum length of the strings is 5000`

``` Output format```

``` ```

`Length of the string S`

`Sample Input #0`

`HARRY`
`SALLY`

``` Sample Output #0 ```

``` 2 ```
``` The longest possible subset of characters that is possible by deleting zero or more characters from HARRY and SALLY is AY, whose length is 2.```

The solution:

``````public class Solution {
public static void main(String[] args) throws Exception {
BufferedReader in = new BufferedReader(new InputStreamReader(System.in));
char[] a = in.readLine().toCharArray();
char[] b = in.readLine().toCharArray();
int[][] dp = new int[a.length + 1][b.length + 1];
dp[0][0] = 1;
for (int i = 0; i < a.length; i++)
for (int j = 0; j < b.length; j++)
if (a[i] == b[j])
dp[i + 1][j + 1] = dp[i][j] + 1;
else
dp[i + 1][j + 1] = Math.max(dp[i][j + 1], dp[i + 1][j]);
System.out.println(dp[a.length][b.length]);
}
}
``````

Anyone has encountered this problem and solved using the solution like this? I solved it in a different way. Only found this solution is elegant, But can not make sense of it so far. Could anyone help explaining it little bit.

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– Joni Jun 10 '13 at 10:27

## 1 Answer

This algorithm uses Dynamic Programming. The key point in understanding dynamic programming is to understand the recursive step which in this case is within the `if-else` statement. My understanding about the matrix of size `(a.length+1) * (b.length +1)` is that for a given element in the matrix `dp[i +1, j +1]` it represents that if the we only compare string `a[0:i]` and `b[0:j]` what will be the child of both `a[0:i]` and `b[0:j]` that has most characters.

So to understand the recursive step, let's look at the example of "HARRY" and "SALLY", say if I am on the step of calculating `dp[5][5]`, in this case, I will be looking at the last character `'Y'`:

A. if `a[4]` and `b[4]` are equal, in this case `"Y" = "Y"`, then i know the optimal solution is: 1) Find out what is the child of `"HARR"` and `"SALL"` that has most characters (let's say n characters) and then 2) add `1 to n`.

B. if `a[4]` and `b[4]` are not equal, then the optimal solution is either Child of `"HARR"` and `"SALLY"` or Child of `"HARRY"` and `"SALL"` which will translate to `Max(dp[i+1][j] and dp[i][j+1])` in the code.

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