Probabilistic inference in many real-world problems requires graphical models with deterministic algebraic constraints between random variables (e.g., Newtonian mechanics, Pascal’s law, Ohm’s law) that are known to be problematic for many inference methods such as Monte Carlo sampling. Fortunately, when such constraintsare invertible, the model can be collapsed and the constraints eliminated through the well-known Jacobian-based change of variables. As our first contributionin this work, we show that a much broader classof algebraic constraints can be collapsed by leveraging the properties of a Dirac delta model of deterministic constraints. Unfortunately, the collapsing processcan lead to highly piecewise densities that pose challenges for...
Statistical inference is at the heart of the probabilistic programming approach to artificial intell...
Symbolic data are distributions constructed from data points. When big datasets can be organised int...
In this paper we describe how MAP inference can be used to sample efficiently from Gibbs distributio...
Many real-world Bayesian inference problems such as preference learning or trader valuation modeling...
Inference is a central problem in probabilistic graphical models, and is often the main sub-step in ...
In this paper, we investigate combining blocking and collapsing - two widely used strategies for imp...
Collapsed Gibbs sampling is a frequently applied method to approximate intractable inte-grals in pro...
First-order probabilistic models combine the power of first-order logic, the de facto tool for handl...
We have a probabilistic statistical model which is required to adapt in the light of observed cases...
In many applications of probabilistic inference the models contain piecewise densities that are...
Mixed probabilistic and deterministic graphical models are ubiquitous in real-world applications. Un...
In this paper we describe how MAP inference can be used to sample efficiently from Gibbs distributio...
We present a method for sampling high-dimensional probability spaces, applicable to Markov fields wi...
Mixed probabilistic and deterministic graphical models are ubiquitous in real-world applications. Un...
Sampling inference methods are computationally difficult to scale for many mod-els in part because g...
Statistical inference is at the heart of the probabilistic programming approach to artificial intell...
Symbolic data are distributions constructed from data points. When big datasets can be organised int...
In this paper we describe how MAP inference can be used to sample efficiently from Gibbs distributio...
Many real-world Bayesian inference problems such as preference learning or trader valuation modeling...
Inference is a central problem in probabilistic graphical models, and is often the main sub-step in ...
In this paper, we investigate combining blocking and collapsing - two widely used strategies for imp...
Collapsed Gibbs sampling is a frequently applied method to approximate intractable inte-grals in pro...
First-order probabilistic models combine the power of first-order logic, the de facto tool for handl...
We have a probabilistic statistical model which is required to adapt in the light of observed cases...
In many applications of probabilistic inference the models contain piecewise densities that are...
Mixed probabilistic and deterministic graphical models are ubiquitous in real-world applications. Un...
In this paper we describe how MAP inference can be used to sample efficiently from Gibbs distributio...
We present a method for sampling high-dimensional probability spaces, applicable to Markov fields wi...
Mixed probabilistic and deterministic graphical models are ubiquitous in real-world applications. Un...
Sampling inference methods are computationally difficult to scale for many mod-els in part because g...
Statistical inference is at the heart of the probabilistic programming approach to artificial intell...
Symbolic data are distributions constructed from data points. When big datasets can be organised int...
In this paper we describe how MAP inference can be used to sample efficiently from Gibbs distributio...