International audienceWe consider the problem of inferring the interactions between a set of N binary variables from the knowledge of their frequencies and pairwise correlations. The inference framework is based on the Hopfield model, a special case of the Ising model where the interaction matrix is defined through a set of patterns in the variable space, and is of rank much smaller than N. We show that Maximum Lik elihood inference is deeply related to Principal Component Analysis when the amp litude of the pattern components, xi, is negligible compared to N^1/2. Using techniques from statistical mechanics, we calculate the corrections to the patterns to the first order in xi/N^1/2. We stress that it is important to generalize the Hopfield...
This paper is concerned with the analysis of correlation between two high-dimensional data sets when...
We survey the statistical mechanics approach to the analysis of neural networks of the Hopfield type...
My PhD thesis is based on Statistical Mechanics themes and their applications. In the second chapter...
Accepted for publication in Physical Review Letters (2011)We introduce a procedure to infer the inte...
<div>Introduction: Since the introduction of the LASSO, computational approaches to variable selecti...
We study the performance of principal component analysis (PCA). In particular, we consider the probl...
We review some recent rigorous results in the theory of neural networks, and in particular on the th...
nuloVile review some recent rigorous results in the theory of neural networks, and in particular on ...
This dissertation discusses several aspects of estimation and inference for high dimensional network...
The mean-field (MF) approximation offers a simple, fast way to infer direct interactions between ele...
Cellular networks in biological systems are complex and as such, identifying the molecular interacti...
International audienceThe mean-field (MF) approximation offers a simple, fast way to infer direct in...
Simultaneous recordings from multiple neural units allow us to investigate the activity of very lar...
The mean field Hopfield model is the paradigm for serial processing networks: a system able to retri...
Hopfield model is one of the few neural networks for which analytical results can be obtained. Howev...
This paper is concerned with the analysis of correlation between two high-dimensional data sets when...
We survey the statistical mechanics approach to the analysis of neural networks of the Hopfield type...
My PhD thesis is based on Statistical Mechanics themes and their applications. In the second chapter...
Accepted for publication in Physical Review Letters (2011)We introduce a procedure to infer the inte...
<div>Introduction: Since the introduction of the LASSO, computational approaches to variable selecti...
We study the performance of principal component analysis (PCA). In particular, we consider the probl...
We review some recent rigorous results in the theory of neural networks, and in particular on the th...
nuloVile review some recent rigorous results in the theory of neural networks, and in particular on ...
This dissertation discusses several aspects of estimation and inference for high dimensional network...
The mean-field (MF) approximation offers a simple, fast way to infer direct interactions between ele...
Cellular networks in biological systems are complex and as such, identifying the molecular interacti...
International audienceThe mean-field (MF) approximation offers a simple, fast way to infer direct in...
Simultaneous recordings from multiple neural units allow us to investigate the activity of very lar...
The mean field Hopfield model is the paradigm for serial processing networks: a system able to retri...
Hopfield model is one of the few neural networks for which analytical results can be obtained. Howev...
This paper is concerned with the analysis of correlation between two high-dimensional data sets when...
We survey the statistical mechanics approach to the analysis of neural networks of the Hopfield type...
My PhD thesis is based on Statistical Mechanics themes and their applications. In the second chapter...
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