Credal networks are graph-based statistical models whose parameters take values in a set, instead of being sharply specified as in traditional statistical models (e.g., Bayesian networks). The computational complexity of inferences on such models depends on the irrelevance/independence concept adopted. In this paper, we study inferential complexity under the concepts of epistemic irrelevance and strong independence. We show that infer-ences under strong independence are NP-hard even in trees with binary variables except for a single ternary one. We prove that under epistemic irrelevance the polynomial-time complexity of inferences in credal trees is not likely to extend to more general models (e.g., singly connected topologies). These resul...
A Bayesian network is a concise representation of a joint probability distribution, which can be use...
Credal networks relax the precise probability requirement of Bayesian networks, enabling a richer re...
We study the computational complexity of finding maximum a posteriori configurations in Bayesian net...
\u3cp\u3eCredal networks are graph-based statistical models whose parameters take values in a set, i...
We replace strong independence in credal networks with the weaker notion of epistemic irrelevance. F...
We summarise and provide pointers to recent advances in inference and identification for specific ty...
AbstractThis paper presents a complete theory of credal networks, structures that associate convex s...
A credal network under epistemic irrelevance is a generalised version of a Bayesian network that loo...
AbstractWe focus on credal nets, which are graphical models that generalise Bayesian nets to impreci...
AbstractCredal networks relax the precise probability requirement of Bayesian networks, enabling a r...
\u3cp\u3eCredal networks generalize Bayesian networks by relaxing the requirement of precision of pr...
Credal networks generalize Bayesian networks by relaxing the requirement of precision of probabiliti...
AbstractCredal networks generalize Bayesian networks by relaxing the requirement of precision of pro...
AbstractThis paper presents a family of algorithms for approximate inference in credal networks (tha...
This paper presents a family of algorithms for approximate inference in credal net-works (that is, m...
A Bayesian network is a concise representation of a joint probability distribution, which can be use...
Credal networks relax the precise probability requirement of Bayesian networks, enabling a richer re...
We study the computational complexity of finding maximum a posteriori configurations in Bayesian net...
\u3cp\u3eCredal networks are graph-based statistical models whose parameters take values in a set, i...
We replace strong independence in credal networks with the weaker notion of epistemic irrelevance. F...
We summarise and provide pointers to recent advances in inference and identification for specific ty...
AbstractThis paper presents a complete theory of credal networks, structures that associate convex s...
A credal network under epistemic irrelevance is a generalised version of a Bayesian network that loo...
AbstractWe focus on credal nets, which are graphical models that generalise Bayesian nets to impreci...
AbstractCredal networks relax the precise probability requirement of Bayesian networks, enabling a r...
\u3cp\u3eCredal networks generalize Bayesian networks by relaxing the requirement of precision of pr...
Credal networks generalize Bayesian networks by relaxing the requirement of precision of probabiliti...
AbstractCredal networks generalize Bayesian networks by relaxing the requirement of precision of pro...
AbstractThis paper presents a family of algorithms for approximate inference in credal networks (tha...
This paper presents a family of algorithms for approximate inference in credal net-works (that is, m...
A Bayesian network is a concise representation of a joint probability distribution, which can be use...
Credal networks relax the precise probability requirement of Bayesian networks, enabling a richer re...
We study the computational complexity of finding maximum a posteriori configurations in Bayesian net...