Reasoning with Uncertainties Over Existence of Objects

In this paper we consider planning problems in relationalMarkov processes where objects may “appear” or “disap-pear”, perhaps depending on previous actions or propertiesof other objects. For instance, problems which require to ex-plicitly generate or discover objects fall into this category. Inour formulation this requires to explicitly represent the un-certainty over the number of objects (dimensions or factors)in a dynamic Bayesian networks (DBN). Many formalisms(also existing ones) are conceivable to formulate such prob-lems. We aim at a formulation that facilitates inference andplanning. Based on a specific formulation we investigate twoinference methods—rejection sampling and reversible-jumpMCMC—to compute a posterior over the process conditionedon the first and last time slice (start and goal state). We willdiscuss properties, efficiency, and appropriateness of eachone.

[1]  Finale Doshi-Velez,et al.  The Infinite Partially Observable Markov Decision Process , 2009, NIPS.

[2]  Ronald P. S. Mahler,et al.  Extended first-order Bayes filter for force aggregation , 2002, SPIE Defense + Commercial Sensing.

[3]  Yee Whye Teh,et al.  Sharing Clusters among Related Groups: Hierarchical Dirichlet Processes , 2004, NIPS.

[4]  L. P. Kaelbling,et al.  Learning Symbolic Models of Stochastic Domains , 2007, J. Artif. Intell. Res..

[5]  Stuart J. Russell,et al.  BLOG: Probabilistic Models with Unknown Objects , 2005, IJCAI.

[6]  R. Mahler,et al.  PHD filters of higher order in target number , 2006, IEEE Transactions on Aerospace and Electronic Systems.

[7]  Thomas L. Griffiths,et al.  The Indian Buffet Process: An Introduction and Review , 2011, J. Mach. Learn. Res..

[8]  Joshua B. Tenenbaum,et al.  Church: a language for generative models , 2008, UAI.

[9]  Neil Immerman,et al.  Abstract Planning with Unknown Object Quantities and Properties , 2009, SARA.

[10]  Hedvig Kjellström,et al.  Multi-target particle filtering for the probability hypothesis density , 2003, ArXiv.

[11]  I. R. Goodman,et al.  Mathematics of Data Fusion , 1997 .

[12]  Marc Toussaint,et al.  Approximate inference for planning in stochastic relational worlds , 2009, ICML '09.

[13]  B. Vo,et al.  A closed-form solution for the probability hypothesis density filter , 2005, 2005 7th International Conference on Information Fusion.

[14]  W. K. Hastings,et al.  Monte Carlo Sampling Methods Using Markov Chains and Their Applications , 1970 .

[15]  Vaidyanathan Ramaswami,et al.  Introduction to Matrix Analytic Methods in Stochastic Modeling , 1999, ASA-SIAM Series on Statistics and Applied Mathematics.

[16]  P. Green Reversible jump Markov chain Monte Carlo computation and Bayesian model determination , 1995 .

[17]  Yee Whye Teh,et al.  The Infinite Factorial Hidden Markov Model , 2008, NIPS.

[18]  Joshua B. Tenenbaum,et al.  Infinite Dynamic Bayesian Networks , 2011, ICML.

[19]  Sumeetpal S. Singh,et al.  Sequential monte carlo implementation of the phd filter for multi-target tracking , 2003, Sixth International Conference of Information Fusion, 2003. Proceedings of the.

[20]  Nando de Freitas,et al.  Nonparametric Bayesian Logic , 2005, UAI.

[21]  Carl E. Rasmussen,et al.  Factorial Hidden Markov Models , 1997 .