A Class of Random Fields on Complete Graphs with Tractable Partition Function

A Class of Random Fields on Complete Graphs with Tractable Partition Function

The aim of this short note is to draw attention to a method by which the partition function and marginal probabilities for a certain class of random fields on complete graphs can be computed in polynomial time. This class includes Ising models with homogeneous pairwise potentials but arbitrary (inho...

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Veröffentlicht in:IEEE transactions on pattern analysis and machine intelligence 2013-09, Vol.35 (9), p.2304-2306
1. Verfasser: Flach, B.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithmics. Computability. Computer arithmetics
Applied sciences
Approximation
Approximation methods
Bipartite graph
Computation
Computational modeling
Computer science
control theory
systems
Exact sciences and technology
Graphs
Information retrieval. Graph
Labeling
Markov random fields
Mathematical analysis
Mathematical models
Partitioning algorithms
Partitions
Pattern analysis
Polynomials
Theoretical computing
Time complexity
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Beschreibung
Zusammenfassung:The aim of this short note is to draw attention to a method by which the partition function and marginal probabilities for a certain class of random fields on complete graphs can be computed in polynomial time. This class includes Ising models with homogeneous pairwise potentials but arbitrary (inhomogeneous) unary potentials. Similarly, the partition function and marginal probabilities can be computed in polynomial time for random fields on complete bipartite graphs, provided they have homogeneous pairwise potentials. We expect that these tractable classes of large-scale random fields can be very useful for the evaluation of approximation algorithms by providing exact error estimates.
ISSN:0162-8828
1939-3539
2160-9292
DOI:10.1109/TPAMI.2013.99