An emerging paradigm proposes that neural computations can be understood at the level of dynamic systems that govern low-dimensional trajectories of collective neural activity. How the connectivity structure of a network determines the emergent dynamical system, however, remains to be clarified. Here we consider a novel class of models, gaussian-mixture, low-rank recurrent networks in which the rank of the connectivity matrix and the number of statistically defined populations are independent hyperparameters. We show that the resulting collective dynamics form a dynamical system, where the rank sets the dimensionality and the population structure shapes the dynamics. In particular, the collective dynamics can be described in terms of a simp...
At a first glance, artificial neural networks, with engineered learning algorithms and carefully cho...
ArticleWe present a mathematical analysis of the effects of Hebbian learning in random recurrent neu...
Recurrent neural networks are complex non-linear systems, capable of ongoing activity in the absence...
International audienceNeural population dynamics are often highly coordinated, allowing task-related...
Recurrent network models are instrumental in investigating how behaviorally-relevant computations em...
Using a generalized random recurrent neural network model, and by extending our recently developed m...
International audienceAbstract A large body of work has suggested that neural populations exhibit lo...
One way to understand the brain is in terms of the computations it performs that allow an organism t...
Recurrent Neural Networks (RNN) are commonly used models to study neural computation. However, a com...
The question of how the collective activity of neural populations in the brain gives rise to complex...
This report is concerned with the relevance of the microscopic rules that implement individual neuro...
The question of how the collective activity of neural populations gives rise to complex behaviour is...
(A) The local representation defines the statistics of synaptic weights Jij by starting from the mar...
We study a family of discrete-time recurrent neural network models in which the synaptic connectivit...
International audienceIn contradiction with Hopfield-like networks, random recurrent neural networks...
At a first glance, artificial neural networks, with engineered learning algorithms and carefully cho...
ArticleWe present a mathematical analysis of the effects of Hebbian learning in random recurrent neu...
Recurrent neural networks are complex non-linear systems, capable of ongoing activity in the absence...
International audienceNeural population dynamics are often highly coordinated, allowing task-related...
Recurrent network models are instrumental in investigating how behaviorally-relevant computations em...
Using a generalized random recurrent neural network model, and by extending our recently developed m...
International audienceAbstract A large body of work has suggested that neural populations exhibit lo...
One way to understand the brain is in terms of the computations it performs that allow an organism t...
Recurrent Neural Networks (RNN) are commonly used models to study neural computation. However, a com...
The question of how the collective activity of neural populations in the brain gives rise to complex...
This report is concerned with the relevance of the microscopic rules that implement individual neuro...
The question of how the collective activity of neural populations gives rise to complex behaviour is...
(A) The local representation defines the statistics of synaptic weights Jij by starting from the mar...
We study a family of discrete-time recurrent neural network models in which the synaptic connectivit...
International audienceIn contradiction with Hopfield-like networks, random recurrent neural networks...
At a first glance, artificial neural networks, with engineered learning algorithms and carefully cho...
ArticleWe present a mathematical analysis of the effects of Hebbian learning in random recurrent neu...
Recurrent neural networks are complex non-linear systems, capable of ongoing activity in the absence...