Problem10176--HDU2296 - Ring

10176: HDU2296 - Ring

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Time Limit : 1.000 sec  Memory Limit : 512 MiB

Description

For the hope of a forever love, Steven is planning to send a ring to Jane with a romantic string engraved on. The string's length should not exceed $N$. 
The careful Steven knows Jane so deeply that he knows her favorite words, such as "love", "forever". Also, he knows the value of each word. The higher value a word has the more joy Jane will get when see it.
The weight of a word is defined as its appeared times in the romantic string multiply by its value, while the weight of the romantic string is defined as the sum of all words' weight. 
You should output the string making its weight maximal.

Input

The input consists of several test cases. 
The first line of input consists of an integer $T$, indicating the number of test cases. 
Each test case starts with a line consisting of two integers: $N, M$, indicating the string's length and the number of Jane's favorite words. 
Each of the following $M$ lines consists of a favorite word $S_i$. 
The last line of each test case consists of $M$ integers, while the $i$-th number indicates the value of $S_i$.

Output

For each test case, output the string to engrave on a single line.
If there's more than one possible answer, first output the shortest one. If there are still multiple solutions, output the smallest in lexicographically order.
The answer may be an empty string.

Constraints

$T ≤ 15$
$0 < N ≤ 50,\ 0 < M ≤ 100$.
The length of each word is less than $11$ and bigger than $0$.
$1 ≤ H_i ≤ 100$.
All the words in the input are different.
All the words just consist of 'a' - 'z'.

Sample 1 Input

2
7 2
love
ever
5 5
5 1
ab
5

Sample 1 Output

lovever
abab
Sample 1: weight(love) = 5, weight(ever) = 5, so weight(lovever) = 5 + 5 = 10
Sample 2: weight(ab) = 2 * 5 = 10, so weight(abab) = 10

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