#P1537E1. Erase and Extend (Easy Version)
Erase and Extend (Easy Version)
Description
This is the easy version of the problem. The only difference is the constraints on $n$ and $k$. You can make hacks only if all versions of the problem are solved.
You have a string $s$, and you can do two types of operations on it:
- Delete the last character of the string.
- Duplicate the string: $s:=s+s$, where $+$ denotes concatenation.
You can use each operation any number of times (possibly none).
Your task is to find the lexicographically smallest string of length exactly $k$ that can be obtained by doing these operations on string $s$.
A string $a$ is lexicographically smaller than a string $b$ if and only if one of the following holds:
- $a$ is a prefix of $b$, but $a\ne b$;
- In the first position where $a$ and $b$ differ, the string $a$ has a letter that appears earlier in the alphabet than the corresponding letter in $b$.
The first line contains two integers $n$, $k$ ($1 \leq n, k \leq 5000$) — the length of the original string $s$ and the length of the desired string.
The second line contains the string $s$, consisting of $n$ lowercase English letters.
Print the lexicographically smallest string of length $k$ that can be obtained by doing the operations on string $s$.
Input
The first line contains two integers $n$, $k$ ($1 \leq n, k \leq 5000$) — the length of the original string $s$ and the length of the desired string.
The second line contains the string $s$, consisting of $n$ lowercase English letters.
Output
Print the lexicographically smallest string of length $k$ that can be obtained by doing the operations on string $s$.
Samples
8 16
dbcadabc
dbcadabcdbcadabc
4 5
abcd
aaaaa
Note
In the first test, it is optimal to make one duplication: "dbcadabc" $\to$ "dbcadabcdbcadabc".
In the second test it is optimal to delete the last $3$ characters, then duplicate the string $3$ times, then delete the last $3$ characters to make the string have length $k$.
"abcd" $\to$ "abc" $\to$ "ab" $\to$ "a" $\to$ "aa" $\to$ "aaaa" $\to$ "aaaaaaaa" $\to$ "aaaaaaa" $\to$ "aaaaaa" $\to$ "aaaaa".