Let's call two strings $a$ and $b$ (both of length $k$) a bit similar if they have the same character in some position, i. e. there exists at least one $i \in [1, k]$ such that $a_i = b_i$.

You are given a binary string $s$ of length $n$ (a string of $n$ characters 0 and/or 1) and an integer $k$. Let's denote the string $s[i..j]$ as the substring of $s$ starting from the $i$-th character and ending with the $j$-th character (that is, $s[i..j] = s_i s_{i + 1} s_{i + 2} \dots s_{j - 1} s_j$).

Let's call a binary string $t$ of length $k$ beautiful if it is a bit similar to all substrings of $s$ having length exactly $k$; that is, it is a bit similar to $s[1..k], s[2..k+1], \dots, s[n-k+1..n]$.

Your goal is to find the lexicographically smallest string $t$ that is beautiful, or report that no such string exists. String $x$ is lexicographically less than string $y$ if either $x$ is a prefix of $y$ (and $x \ne y$), or there exists such $i$ ($1 \le i \le \min(|x|, |y|)$), that $x_i < y_i$, and for any $j$ ($1 \le j < i$) $x_j = y_j$.