Paper Info
Title
Understanding The Complexity Of Lifted Inference And Asymmetric Weighted Model Counting
Abstract
In this paper we study lifted inference for the Weighted First-Order Model Counting problem (WFOMC), which counts the assignments that satisfy a given sentence in first-order logic (FOL); it has applications in Statistical Relational Learning (SRL) and Probabilistic Databases (PDB). We present several results. First, we describe a lifted inference algorithm that generalizes prior approaches in SRL and PDB. Second, we provide a novel dichotomy result for a non-trivial fragment of FO CNF sentences, showing that for each sentence the WFOMC problem is either in PTIME or P-hard in the size of the input domain; we prove that, in the first case our algorithm solves the WFOMC problem in PTIME, and in the second case it fails. Third, we present several properties of the algorithm. Finally, we discuss limitations of lifted inference for symmetric probabilistic databases (where the weights of ground literals depend only on the relation name, and not on the constants of the domain), and prove the impossibility of a dichotomy result for the complexity of probabilistic inference for the entire language FOL.
Year
Venue
Field
2014
UNCERTAINTY IN ARTIFICIAL INTELLIGENCE
Probabilistic inference,Inference,Computer science,Statistical relational learning,P,Algorithm,Impossibility,Artificial intelligence,Probabilistic logic,Sentence,Machine learning,Model counting
DocType
Volume
Citations 
Conference
abs/1405.3250
9
PageRank 
References 
Authors
0.50
20
3
Name
Order
Citations
PageRank
Eric Gribkoff1594.25
Guy Van den Broeck249442.25
Dan Suciu396251349.54