论文信息 - Recursive Algorithms for Approximating Probabilities in Graphical Models

Recursive Algorithms for Approximating Probabilities in Graphical Models

We develop a recursive node-elimination formalism for efficiently approximating large probabilistic networks. No constraints are set on the network topologies. Yet the formalism can be straightforwardly integrated with exact methods whenever they are/become applicable. The approximations we use are controlled: they maintain consistently upper and lower bounds on the desired quantities at all times. We show that Boltzmann machines, sigmoid belief networks, or any combination (i.e., chain graphs) can be handled within the same framework. The accuracy of the methods is verified experimentally.

Michael I. Jordan | Tommi S. Jaakkola | T. Jaakkola

[1] Carsten Peterson,et al. A Mean Field Theory Learning Algorithm for Neural Networks , 1987, Complex Syst..

[2] Radford M. Neal. Connectionist Learning of Belief Networks , 1992, Artif. Intell..

[3] Geoffrey E. Hinton,et al. The Helmholtz Machine , 1995, Neural Computation.

[4] Michael I. Jordan,et al. Exploiting Tractable Substructures in Intractable Networks , 1995, NIPS.

[5] Michael I. Jordan,et al. Mean Field Theory for Sigmoid Belief Networks , 1996, J. Artif. Intell. Res..

[6] Michael I. Jordan,et al. Computing upper and lower bounds on likelihoods in intractable networks , 1996, UAI.

[7] Michael I. Jordan. Graphical Models , 1998 .