There are $n$ thieves and $k$ prisons. A thief is either on the run or caught in a prison. Initially all thieves are on the run.
A thief who is on the run can be caught by the police, and then ends up in one of the prisons. A thief who is on the run can also open the gate of a prison. Then every thief in that prison is released from the prison. It would be pointless to open the gate of an empty prison, so that never happens.
You are given a list of $m$ events of the form "thief $x$ has been caught" or "thief $x$ has opened the gate of a prison". Your task is to find a prison assignment that corresponds to the events, or determine that it is not possible.
Input
The first input line has three integers $n$, $k$ and $m$: the number of thieves, prisons and events. The thieves and prisons are numbered $1,2,\dots,n$ and $1,2,\dots,k$.
After this, there are $m$ lines that describe the events. Each event is "C x" (thief $x$ has been caught) or "O x" (thief $x$ opens the gate of a prison).
Output
Print a valid prison assignment that consists of $m$ integers: for every event the corresponding prison. If there are no solutions, print "IMPOSSIBLE".
Example
Input 1
3 2 5 C 1 C 2 O 3 O 2 C 1
Output 1
1 2 2 1 1
Input 2
1 1 1 O 1
Output 2
IMPOSSIBLE
Subtasks
Subtask 1 (8 points)
- $1 \le n,m \le 10$
- $k=2$
Subtask 2 (13 points)
- $1 \le n,k,m \le 10^5$
- $n=k$
Subtask 3 (14 points)
- $1 \le n,m \le 10^5$
- $k=2$
Subtask 4 (18 points)
- $1 \le n,k,m \le 500$
Subtask 5 (47 points)
- $1 \le n,k,m \le 10^5$