论文信息 - Bayesian parameter estimation via variational methods

Bayesian parameter estimation via variational methods

We consider a logistic regression model with a Gaussian prior distribution over the parameters. We show that an accurate variational transformation can be used to obtain a closed form approximation to the posterior distribution of the parameters thereby yielding an approximate posterior predictive model. This approach is readily extended to binary graphical model with complete observations. For graphical models with incomplete observations we utilize an additional variational transformation and again obtain a closed form approximation to the posterior. Finally, we show that the dual of the regression problem gives a latent variable density model, the variational formulation of which leads to exactly solvable EM updates.

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

[1] 丸山徹. Convex Analysisの二,三の進展について , 1977 .

[2] Brian Everitt,et al. An Introduction to Latent Variable Models , 1984 .

[3] David J. Spiegelhalter,et al. Sequential updating of conditional probabilities on directed graphical structures , 1990, Networks.

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

[5] Geoffrey E. Hinton,et al. Keeping the neural networks simple by minimizing the description length of the weights , 1993, COLT '93.

[6] Néstor Parga,et al. Duality Between Learning Machines: A Bridge Between Supervised and Unsupervised Learning , 1994, Neural Computation.

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

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

[9] Peter Green,et al. Markov chain Monte Carlo in Practice , 1996 .

[10] Michael E. Tipping. Probabilistic Visualisation of High-Dimensional Binary Data , 1998, NIPS.

[11] Eric R. Ziegel,et al. Generalized Linear Models , 2002, Technometrics.