Sparse nested Markov models with log-linear parameters
Sparse nested Markov models with log-linear parameters
Hidden variables are ubiquitous in practical data analysis, and therefore modeling marginal densities and doing inference with the resulting models is an important problem in statistics, machine learning, and causal inference. Recently, a new type of graphical model, called the nested Markov model, was developed which captures equality constraints found in marginals of directed acyclic graph (DAG) models. Some of these constraints, such as the so called `Verma constraint', strictly generalize conditional independence. To make modeling and inference with nested Markov models practical, it is necessary to limit the number of parameters in the model, while still correctly capturing the constraints in the marginal of a DAG model. Placing such limits is similar in spirit to sparsity methods for undirected graphical models, and regression models. In this paper, we give a log-linear parameterization which allows sparse modeling with nested Markov models. We illustrate the advantages of this parameterization with a simulation study.
576-585
Shpitser, Ilya
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Evans, Robin
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Richardson, Thomas
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Robins, James
07f22141-0fc1-4897-add5-5368b640844d
2013
Shpitser, Ilya
4d295b9b-39e8-417f-b38d-fbb5d7df6992
Evans, Robin
be1ff490-8966-4e9e-8b57-abdfa567a2d9
Richardson, Thomas
e2c965c5-11d8-4c77-b9b6-9d7208549c38
Robins, James
07f22141-0fc1-4897-add5-5368b640844d
Shpitser, Ilya, Evans, Robin, Richardson, Thomas and Robins, James
(2013)
Sparse nested Markov models with log-linear parameters.
In Proceedings of the Twenty Ninth Conference on Uncertainty in Artificial Intelligence (UAI-13).
AUAI Press.
.
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Conference or Workshop Item
(Paper)
Abstract
Hidden variables are ubiquitous in practical data analysis, and therefore modeling marginal densities and doing inference with the resulting models is an important problem in statistics, machine learning, and causal inference. Recently, a new type of graphical model, called the nested Markov model, was developed which captures equality constraints found in marginals of directed acyclic graph (DAG) models. Some of these constraints, such as the so called `Verma constraint', strictly generalize conditional independence. To make modeling and inference with nested Markov models practical, it is necessary to limit the number of parameters in the model, while still correctly capturing the constraints in the marginal of a DAG model. Placing such limits is similar in spirit to sparsity methods for undirected graphical models, and regression models. In this paper, we give a log-linear parameterization which allows sparse modeling with nested Markov models. We illustrate the advantages of this parameterization with a simulation study.
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Published date: 2013
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Local EPrints ID: 359798
URI: http://eprints.soton.ac.uk/id/eprint/359798
PURE UUID: 6e4941f8-6590-41ae-aa9e-79992ab6ac0e
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Date deposited: 13 Nov 2013 13:18
Last modified: 14 Mar 2024 15:29
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Author:
Ilya Shpitser
Author:
Robin Evans
Author:
Thomas Richardson
Author:
James Robins
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