E. New Year and the Acquaintance Estimation
time limit per test
2 seconds
memory limit per test
256 megabytes
input
standard input
output
standard output

Bob is an active user of the social network Faithbug. On this network, people are able to engage in a mutual friendship. That is, if $$$a$$$ is a friend of $$$b$$$, then $$$b$$$ is also a friend of $$$a$$$. Each user thus has a non-negative amount of friends.

This morning, somebody anonymously sent Bob the following link: graph realization problem and Bob wants to know who that was. In order to do that, he first needs to know how the social network looks like. He investigated the profile of every other person on the network and noted down the number of his friends. However, he neglected to note down the number of his friends. Help him find out how many friends he has. Since there may be many possible answers, print all of them.

Input

The first line contains one integer $$$n$$$ ($$$1 \leq n \leq 5 \cdot 10^5$$$), the number of people on the network excluding Bob.

The second line contains $$$n$$$ numbers $$$a_1,a_2, \dots, a_n$$$ ($$$0 \leq a_i \leq n$$$), with $$$a_i$$$ being the number of people that person $$$i$$$ is a friend of.

Output

Print all possible values of $$$a_{n+1}$$$ — the amount of people that Bob can be friend of, in increasing order.

If no solution exists, output $$$-1$$$.

Examples
Input
3
3 3 3
Output
3 
Input
4
1 1 1 1
Output
0 2 4 
Input
2
0 2
Output
-1
Input
35
21 26 18 4 28 2 15 13 16 25 6 32 11 5 31 17 9 3 24 33 14 27 29 1 20 4 12 7 10 30 34 8 19 23 22
Output
13 15 17 19 21 
Note

In the first test case, the only solution is that everyone is friends with everyone. That is why Bob should have $$$3$$$ friends.

In the second test case, there are three possible solutions (apart from symmetries):

  • $$$a$$$ is friend of $$$b$$$, $$$c$$$ is friend of $$$d$$$, and Bob has no friends, or
  • $$$a$$$ is a friend of $$$b$$$ and both $$$c$$$ and $$$d$$$ are friends with Bob, or
  • Bob is friends of everyone.

The third case is impossible to solve, as the second person needs to be a friend with everybody, but the first one is a complete stranger.