Searching for a solution to a problem is usually an NP-hard problem resulting in a combinatorial explosion of possible solutions to investigate. This problem is often ameliorated through the use of heuristics, or sub-routines to make "intelligent" choices along the decision tree. An appropriately defined heuristic can quicken the search by eliminating obviously unsuccessful paths from the search tree. An inappropriately defined heuristic might eliminate the successful solutions and result in no evident solution.
Bayesian networks can replace heuristic methods by introducing a method where the probabilities are updated continually during search.
One class of search algorithms called Stochastic searching utilizes what are known as "Monte-Carlo" procedures. These procedures are non-deterministic and do not guarantee a solution to a problem. As such they are very fast, and repeated use of these algorithms will add evidence that a solution does not exist even though they never prove that such a solution is non-existent.
"Coupling such procedures with knowledge of properties of the distribution from which problem instances are drawn may be an effective way of extending the utility of these algorithms"[17] [1] by helping to focus in on areas of the search tree not previously studied.