Permutation Game (30 Points)
Alice and Bob play the following game:
1) They choose a permutation of the first N numbers to begin with.
2) They play alternately and Alice plays first.
3) In a turn, they can remove any one remaining number from the permutation.
4) The game ends when the remaining numbers form an increasing sequence. The person who played the last turn (after which the sequence becomes increasing) wins the game.
Assuming both play optimally, who wins the game?
The first line contains the number of test cases T. T test cases follow. Each case contains an integer N on the first line, followed by a permutation of the integers 1..N on the second line.
Output T lines, one for each test case, containing "Alice" if Alice wins the game and "Bob" otherwise.
1 <= T <= 100
2 <= N <= 15
The permutation will not be an increasing sequence initially.
1 3 2
5 3 2 1 4
Explanation: For the first example, Alice can remove the 3 or the 2 to make the sequence increasing and wins the game.
Can someone please help me out on the second input case: 5 3 2 1 4
The increasing sequences possible are:
1) 3 4 - Removing 5 , 2 , 1 in any sequence
2) 2 4 - Removing 5 , 3 , 1 in any sequence
3) 1 4 - Removing 5 , 3 , 2 in any sequence
So the output should be Alice?
Please do not share any code. Thanks