posted on 2007-01-01, 00:00authored byBrian D. Ziebart, Anind K. Dey, J. Andrew Bagnell
Dealing with uncertainty in Bayesian Net-
work structures using maximum a posteriori
(MAP) estimation or Bayesian Model Averaging (BMA) is often intractable due to
the superexponential number of possible directed, acyclic graphs. When the prior is
decomposable, two classes of graphs where
efficient learning can take place are tree-
structures, and fixed-orderings with limited
in-degree. We show how MAP estimates
and BMA for selectively conditioned forests
(SCF), a combination of these two classes,
can be computed efficiently for ordered sets of
variables. We apply SCFs to temporal data
to learn Dynamic Bayesian Networks having
an intra-timestep forest and inter-timestep
limited in-degree structure, improving model
accuracy over DBNs without the combination
of structures. We also apply SCFs to Bayes
Net classification to learn selective forest-
augmented Na¨ıve Bayes classifiers. We argue that the built-in feature selection of selective augmented Bayes classifiers makes them
preferable to similar non-selective classifiers
based on empirical evidence.