The complexity of some polynomial network consistency algorithms for constraint satisfaction problems

Constraint satisfaction problems play a central role in artificial intelligence. A class of network consistency algorithms for eliminating local inconsistencies in such problems has previously been described. We analyze the time complexity of several node, arc and path consistency algorithms and prove that arc consistency is achievable in time linear in the number of binary constraints. The Waltz filtering algorithm is a special case of the arc consistency algorithm. In the edge labelling computational vision application the constraint graph is planar and so the time complexity is linear in the number of variables.