We present the path-sum formulation for exact statistical inference of marginals on Gaussian graphical models of arbitrary topology. The path-sum formulation gives the covariance between each pair of variables as a branched continued fraction of finite depth and breadth. Our method originates from the closed-form resummation of infinite families of terms of the walk-sum representation of the covariance matrix. We prove that the path-sum formulation always exists for models whose covariance matrix is positive definite: i.e. it is valid for both walk-summable and non-walk-summable graphical models of arbitrary topology. We show that for graphical models on trees the path-sum formulation is equivalent to Gaussian belief propagation. We also re...
We derive a combinatorial sufficient condition for a partial correlation hypersurface in the paramet...
The research reported in this thesis focuses on approximation techniques for inference in graphical ...
We present a new interpretation of Gaussian belief propagation (GaBP) based on the 'zeta function' r...
We present the path-sum formulation for exact statistical inference of marginals on Gaussian graphic...
We present the path-sum formulation for exact statistical inference of marginals on Gaussian graphic...
We present a new framework based on walks in a graph for analysis and inference in Gaussian graphica...
Graphical models provide a powerful formalism for statistical signal processing. Due to their sophis...
Graphical models provide a powerful formalism for statistical signal processing. Due to their sophis...
Graphical models, such as Bayesian networks and Markov random fields represent statistical dependenc...
We introduce a nonparametric method for estimating non-Gaussian graphical models based on a new stat...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
Belief propagation (BP) on cyclic graphs is an efficient algorithm for computing approximate margina...
We study the marginal-MAP problem on graphical models, and present a novel approximation method base...
Local "belief propagation " rules of the sort proposed by Pearl [15] are guaranteed to con...
Inference, along with estimation and decoding, are the three key operations one must be able to perf...
We derive a combinatorial sufficient condition for a partial correlation hypersurface in the paramet...
The research reported in this thesis focuses on approximation techniques for inference in graphical ...
We present a new interpretation of Gaussian belief propagation (GaBP) based on the 'zeta function' r...
We present the path-sum formulation for exact statistical inference of marginals on Gaussian graphic...
We present the path-sum formulation for exact statistical inference of marginals on Gaussian graphic...
We present a new framework based on walks in a graph for analysis and inference in Gaussian graphica...
Graphical models provide a powerful formalism for statistical signal processing. Due to their sophis...
Graphical models provide a powerful formalism for statistical signal processing. Due to their sophis...
Graphical models, such as Bayesian networks and Markov random fields represent statistical dependenc...
We introduce a nonparametric method for estimating non-Gaussian graphical models based on a new stat...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
Belief propagation (BP) on cyclic graphs is an efficient algorithm for computing approximate margina...
We study the marginal-MAP problem on graphical models, and present a novel approximation method base...
Local "belief propagation " rules of the sort proposed by Pearl [15] are guaranteed to con...
Inference, along with estimation and decoding, are the three key operations one must be able to perf...
We derive a combinatorial sufficient condition for a partial correlation hypersurface in the paramet...
The research reported in this thesis focuses on approximation techniques for inference in graphical ...
We present a new interpretation of Gaussian belief propagation (GaBP) based on the 'zeta function' r...