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## Directed PS-graphs

Time limit = 5 second(s)

Your program should check if graph is directed PS-graph.

Directed PS-graph is directed graph (or multigraph — graph with multiple edges) that can be produced from one-edge graph by the applying operations:

1) double edge : from "A->B" make two edges "A->B" and "A->B".

2) split edge: from "A->B" make two edges "A->C" and "C->B", where C is new vertex.

Graph descriptinon is set of lines, each line contains edge description.

Edge description is two identifiers of vertices delimited by space. Vertex identifier is nonempty word from B*, B={A..Z, a..z, 0..9}. Word length is less than 11 letters.

Graph G

```  A B
B C
C D
B K
K C
A D
```
is directed PS-graph.

It can be produced from edge "A->D" in the following way: Note that

1. PS-graph has no cycles.
2. PS-graph has one root (no in-edges) and one leave (no out-edges).
These conditions are necessary but not sufficient.

Input. Graph description. Number of edges is less than 35000.

Output. First line should contain YES or NO depending on whether the input graph is PS-graph. If YES, then next line should have description of operation sequence.

When doubling the edge "A-B" one writes

```[A-B A-B]
```

When spliting the edge "A-B" by vertex C one writes

```(A-C C-B)
```

So for the given sample graph G output can be the following:

```A-D
[A-D A-D]
[(A-B B-D) A-D]
[(A-B (B-C C-D)) A-D]
[(A-B ([B-C B-C] C-D)) A-D]
[(A-B ([B-C (B-K K-C)] C-D)) A-D]
```

Your program should output only the last line.

 Input#1```A B B C B K K C A D C D ``` Output#1```YES [(A-B ([B-C (B-K K-C)] C-D)) A-D] ```
 Input#2```A B B C A D D C D B ``` Output#2```NO ```
 Input#3```A B B C B C A B A C B C ``` Output#3```YES [A-C ([A-B A-B] [B-C B-C B-C])] ```

Author:
Artem Voroztsov
9 May 2006

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