TY - GEN
T1 - Complexity of K-Tree Structured Constraint Satisfaction Problems
AU - Freuder, Eugene C.
N1 - Publisher Copyright:
Copyright © 1990, AAAI (www.aaai.org). All rights reserved.
PY - 1990
Y1 - 1990
N2 - Trees have played a key role in the study of constraint satisfaction problems because problems with tree structure can be solved efficiently. It is shown here that a family of generalized trees, k-trees, can offer increasing representational complexity for constraint satisfaction problems, while maintaining a bound on computational complexity linear in the number of variables and exponential in k. Additional results are obtained for larger classes of graphs known as partial k-trees. These methods may be helpful even when the original problem does not have k-tree or partial k-tree structure. Specific tradeoffs are suggested between representational power and computational complexity.
AB - Trees have played a key role in the study of constraint satisfaction problems because problems with tree structure can be solved efficiently. It is shown here that a family of generalized trees, k-trees, can offer increasing representational complexity for constraint satisfaction problems, while maintaining a bound on computational complexity linear in the number of variables and exponential in k. Additional results are obtained for larger classes of graphs known as partial k-trees. These methods may be helpful even when the original problem does not have k-tree or partial k-tree structure. Specific tradeoffs are suggested between representational power and computational complexity.
UR - https://www.scopus.com/pages/publications/84959244144
M3 - Conference proceeding
AN - SCOPUS:84959244144
T3 - Proceedings of the 8th National Conference on Artificial Intelligence, AAAI 1990
SP - 4
EP - 9
BT - Proceedings of the 8th National Conference on Artificial Intelligence, AAAI 1990
PB - AAAI Press
T2 - 8th National Conference on Artificial Intelligence, AAAI 1990
Y2 - 29 July 1990 through 3 August 1990
ER -