0.00/0.29	YES
0.00/0.29	
0.00/0.29	
0.00/0.29	
0.00/0.29	
0.00/0.29	The system was filtered by the following matrix interpretation
0.00/0.29	of type E_J with J = {1,...,2} and dimension 4:
0.00/0.29	
0.00/0.29	a is interpreted by
0.00/0.29	 /       \
0.00/0.29	| 1 0 1 0 |
0.00/0.29	| 0 1 0 0 |
0.00/0.29	| 0 0 0 0 |
0.00/0.29	| 0 1 0 0 |
0.00/0.29	 \       /
0.00/0.29	b is interpreted by
0.00/0.29	 /       \
0.00/0.29	| 1 0 0 0 |
0.00/0.29	| 0 1 0 0 |
0.00/0.29	| 0 0 0 1 |
0.00/0.29	| 0 0 0 0 |
0.00/0.29	 \       /
0.00/0.29	
0.00/0.29	Remains to prove termination of the 1-rule system
0.00/0.29	{ b b b -> b b }
0.00/0.29	
0.00/0.29	
0.00/0.29	The system was filtered by the following matrix interpretation
0.00/0.29	of type E_J with J = {1,...,2} and dimension 2:
0.00/0.29	
0.00/0.29	a is interpreted by
0.00/0.29	 /   \
0.00/0.29	| 1 0 |
0.00/0.29	| 0 1 |
0.00/0.29	 \   /
0.00/0.29	b is interpreted by
0.00/0.29	 /   \
0.00/0.29	| 1 1 |
0.00/0.29	| 0 1 |
0.00/0.29	 \   /
0.00/0.29	
0.00/0.29	Remains to prove termination of the 0-rule system
0.00/0.29	{ }
0.00/0.29	
0.00/0.29	
0.00/0.29	The system is trivially terminating.
0.00/0.33	EOF