We introduce Network Maximal Correlation (NMC) as a multivariate measure of nonlinear association among random variables. NMC is defined via an optimization that infers transformations of variables by maximizing aggregate inner products between transformed variables. For finite discrete and jointly Gaussian random variables, we characterize a solution of the NMC optimization using basis expansion of functions over appropriate basis functions. For finite discrete variables, we propose an algorithm based on alternating conditional expectation to determine NMC. Moreover we propose a distributed algorithm to compute an approximation of NMC for large and dense graphs using graph partitioning. For finite discrete variables, we show that the proba...
In recent years, there has been a great surge of interest among physicists in modeling social, techn...
Sub-networks can expose complex patterns in an entire bio-molecular network by extracting interactio...
© 2019 Institute of Mathematical Statistics. We analyze the problem of maximum likelihood estimation...
© 2017 IEEE. We introduce Network Maximal Correlation (NMC) as a multivariate measure of nonlinear a...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract Background The models in this article generalize current models for both correlation networ...
Understanding and developing a correlation measure that can detect general dependencies is not only ...
Classical decision theory evaluates an estimator mostly by its statistical properties, either the cl...
Structural learning of Gaussian directed acyclic graphs (DAGs) or Bayesian networks has been studied...
We consider a decision network on an undirected graph in which each node corresponds to a decision v...
Inferring a graphical model or network from observational data from a large number of variables is a...
We construct a correlation-based biological network from a data set containing temporal expressions ...
We seek to identify one or more computationally light-weight centrality metrics that have a high cor...
Sub-networks can expose complex patterns in an entire bio-molecular network by extracting interactio...
Topologies of real-world complex networks are rarely accessible, but can often be reconstructed from...
In recent years, there has been a great surge of interest among physicists in modeling social, techn...
Sub-networks can expose complex patterns in an entire bio-molecular network by extracting interactio...
© 2019 Institute of Mathematical Statistics. We analyze the problem of maximum likelihood estimation...
© 2017 IEEE. We introduce Network Maximal Correlation (NMC) as a multivariate measure of nonlinear a...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract Background The models in this article generalize current models for both correlation networ...
Understanding and developing a correlation measure that can detect general dependencies is not only ...
Classical decision theory evaluates an estimator mostly by its statistical properties, either the cl...
Structural learning of Gaussian directed acyclic graphs (DAGs) or Bayesian networks has been studied...
We consider a decision network on an undirected graph in which each node corresponds to a decision v...
Inferring a graphical model or network from observational data from a large number of variables is a...
We construct a correlation-based biological network from a data set containing temporal expressions ...
We seek to identify one or more computationally light-weight centrality metrics that have a high cor...
Sub-networks can expose complex patterns in an entire bio-molecular network by extracting interactio...
Topologies of real-world complex networks are rarely accessible, but can often be reconstructed from...
In recent years, there has been a great surge of interest among physicists in modeling social, techn...
Sub-networks can expose complex patterns in an entire bio-molecular network by extracting interactio...
© 2019 Institute of Mathematical Statistics. We analyze the problem of maximum likelihood estimation...