TY - GEN
T1 - Compactness and its implications for qualitative spatial and temporal reasoning
AU - Huang, Jinbo
PY - 2012
Y1 - 2012
N2 - A constraint satisfaction problem has compactness if any infinite set of constraints is satisfiable whenever all its finite subsets are satisfiable. We prove a sufficient condition for compactness, which holds for a range of problems including those based on the well-known Interval Algebra (IA) and RCC8. Furthermore, we show that compactness leads to a useful necessary and sufficient condition for the recently introduced patchwork property, namely that patchwork holds exactly when every satisfiable finite network (i.e., set of constraints) has a canonical solution, that is, a solution that can be extended to a solution for any satisfiable finite extension of the network. Applying these general theorems to qualitative reasoning, we obtain important new results as well as significant strengthenings of previous results regarding IA, RCC8, and their fragments and extensions. In particular, we show that all the maximal tractable fragments of IA and RCC8 (containing the base relations) have patchwork and canonical solutions as long as networks are algebraically closed.
AB - A constraint satisfaction problem has compactness if any infinite set of constraints is satisfiable whenever all its finite subsets are satisfiable. We prove a sufficient condition for compactness, which holds for a range of problems including those based on the well-known Interval Algebra (IA) and RCC8. Furthermore, we show that compactness leads to a useful necessary and sufficient condition for the recently introduced patchwork property, namely that patchwork holds exactly when every satisfiable finite network (i.e., set of constraints) has a canonical solution, that is, a solution that can be extended to a solution for any satisfiable finite extension of the network. Applying these general theorems to qualitative reasoning, we obtain important new results as well as significant strengthenings of previous results regarding IA, RCC8, and their fragments and extensions. In particular, we show that all the maximal tractable fragments of IA and RCC8 (containing the base relations) have patchwork and canonical solutions as long as networks are algebraically closed.
UR - http://www.scopus.com/inward/record.url?scp=84893389336&partnerID=8YFLogxK
M3 - Conference contribution
SN - 9781577355601
T3 - Proceedings of the International Conference on Knowledge Representation and Reasoning
SP - 500
EP - 508
BT - 13th International Conference on the Principles of Knowledge Representation and Reasoning, KR 2012
PB - Institute of Electrical and Electronics Engineers Inc.
T2 - 13th International Conference on the Principles of Knowledge Representation and Reasoning, KR 2012
Y2 - 10 June 2012 through 14 June 2012
ER -