We present completeness results for inference in Bayesian networks with respect to two different parameterizations, namely the number of variables and the topological vertex separation number. For this we introduce the parameterized complexity classes W[1]PP and XLPP, which relate to W[1] and XNLP respectively as PP does to NP. The second parameter is intended as a natural translation of the notion of pathwidth to the case of directed acyclic graphs, and as such it is a stronger parameter than the more commonly considered treewidth. Based on a recent conjecture, the completeness results for this parameter suggest that deterministic algorithms for inference require exponential space in terms of pathwidth and by extension treewidth. These res...
Graphical models provide a convenient representation for a broad class of probability distributions....
\u3cp\u3eThis paper presents new results for the (partial) maximum a posteriori (MAP) problem in Bay...
MAP is the problem of finding a most probable instantiation of a set of variables given evidence. MA...
We present completeness results for inference in Bayesian networks with respect to two different par...
We present completeness results for inference in Bayesian networks with respect to two different par...
Computing posterior and marginal probabilities constitutes the backbone of almost all inferences in ...
The problem of finding the most probable explanation to a designated set of variables given partial ...
We present new polynomial time algorithms for inference problems in Bayesian networks (BNs) when res...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
Contains fulltext : 160422.pdf (publisher's version ) (Open Access)Computing poste...
The problem of finding the most probable explanation to a designated set of vari-ables given partial...
We examine the inferential complexity of Bayesian networks specified through logical constructs. We ...
Contains fulltext : 83932.pdf (preprint version ) (Open Access)ECAI 2010, 16 augus...
The computational complexity of inference is now one of the most relevant topics in the field of Bay...
With the increased availability of data for complex domains, it is desirable to learn Bayesian netwo...
Graphical models provide a convenient representation for a broad class of probability distributions....
\u3cp\u3eThis paper presents new results for the (partial) maximum a posteriori (MAP) problem in Bay...
MAP is the problem of finding a most probable instantiation of a set of variables given evidence. MA...
We present completeness results for inference in Bayesian networks with respect to two different par...
We present completeness results for inference in Bayesian networks with respect to two different par...
Computing posterior and marginal probabilities constitutes the backbone of almost all inferences in ...
The problem of finding the most probable explanation to a designated set of variables given partial ...
We present new polynomial time algorithms for inference problems in Bayesian networks (BNs) when res...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
Contains fulltext : 160422.pdf (publisher's version ) (Open Access)Computing poste...
The problem of finding the most probable explanation to a designated set of vari-ables given partial...
We examine the inferential complexity of Bayesian networks specified through logical constructs. We ...
Contains fulltext : 83932.pdf (preprint version ) (Open Access)ECAI 2010, 16 augus...
The computational complexity of inference is now one of the most relevant topics in the field of Bay...
With the increased availability of data for complex domains, it is desirable to learn Bayesian netwo...
Graphical models provide a convenient representation for a broad class of probability distributions....
\u3cp\u3eThis paper presents new results for the (partial) maximum a posteriori (MAP) problem in Bay...
MAP is the problem of finding a most probable instantiation of a set of variables given evidence. MA...