AbstractThis paper presents a complete theory of credal networks, structures that associate convex sets of probability measures with directed acyclic graphs. Credal networks are graphical models for precise/imprecise beliefs. The main contribution of this work is a theory of credal networks that displays as much flexibility and representational power as the theory of standard Bayesian networks. Results in this paper show how to express judgements of irrelevance and independence, and how to compute inferences in credal networks. A credal network admits several extensions—several sets of probability measures comply with the constraints represented by a network. Two types of extensions are investigated. The properties of strong extensions are ...
AbstractCredal networks generalize Bayesian networks by relaxing the requirement of precision of pro...
\u3cp\u3eCredal networks are graph-based statistical models whose parameters take values in a set, i...
Credal networks generalize Bayesian networks by relaxing the requirement of precision of probabiliti...
AbstractThis paper presents a complete theory of credal networks, structures that associate convex s...
Abstract Credal networks enhance robustness and modelling power of Bayesian networks by allowing for...
A credal network under epistemic irrelevance is a generalised version of a Bayesian network that loo...
AbstractA credal network is a graphical representation for a set of joint probability distributions....
AbstractCredal networks are models that extend Bayesian nets to deal with imprecision in probability...
AbstractCredal networks relax the precise probability requirement of Bayesian networks, enabling a r...
AbstractThis paper presents a family of algorithms for approximate inference in credal networks (tha...
Credal networks are graph-based statistical models whose parameters take values in a set, instead of...
We replace strong independence in credal networks with the weaker notion of epistemic irrelevance. F...
We present a new approach to credal networks, which are graphical models that generalise Bayesian ne...
A credal network is a graphical tool for representation and manipulation of uncertainty, where proba...
A Bayesian network is a concise representation of a joint probability distribution, which can be use...
AbstractCredal networks generalize Bayesian networks by relaxing the requirement of precision of pro...
\u3cp\u3eCredal networks are graph-based statistical models whose parameters take values in a set, i...
Credal networks generalize Bayesian networks by relaxing the requirement of precision of probabiliti...
AbstractThis paper presents a complete theory of credal networks, structures that associate convex s...
Abstract Credal networks enhance robustness and modelling power of Bayesian networks by allowing for...
A credal network under epistemic irrelevance is a generalised version of a Bayesian network that loo...
AbstractA credal network is a graphical representation for a set of joint probability distributions....
AbstractCredal networks are models that extend Bayesian nets to deal with imprecision in probability...
AbstractCredal networks relax the precise probability requirement of Bayesian networks, enabling a r...
AbstractThis paper presents a family of algorithms for approximate inference in credal networks (tha...
Credal networks are graph-based statistical models whose parameters take values in a set, instead of...
We replace strong independence in credal networks with the weaker notion of epistemic irrelevance. F...
We present a new approach to credal networks, which are graphical models that generalise Bayesian ne...
A credal network is a graphical tool for representation and manipulation of uncertainty, where proba...
A Bayesian network is a concise representation of a joint probability distribution, which can be use...
AbstractCredal networks generalize Bayesian networks by relaxing the requirement of precision of pro...
\u3cp\u3eCredal networks are graph-based statistical models whose parameters take values in a set, i...
Credal networks generalize Bayesian networks by relaxing the requirement of precision of probabiliti...