We algorithmically determine the regions and facets of all dimensions of the canonical polyhedral complex, the universal object into which a ReLU network decomposes its input space. We show that the locations of the vertices of the canonical polyhedral complex along with their signs with respect to layer maps determine the full facet structure across all dimensions. We present an algorithm which calculates this full combinatorial structure, making use of our theorems that the dual complex to the canonical polyhedral complex is cubical and it possesses a multiplication compatible with its facet structure. The resulting algorithm is numerically stable, polynomial time in the number of intermediate neurons, and obtains accurate information acr...
"Artificial neural networks" provide an appealing model of computation. Such networks consist of an ...
We contribute to a better understanding of the class of functions that can be represented by a neura...
This dissertation explores applications of discrete geometry in mathematical neuroscience. We begin ...
We identify tessellation-filtering ReLU neural networks that, when composed with another ReLU netwo...
We contribute to a better understanding of the class of functions that is represented by a neural ne...
We can compare the expressiveness of neural networks that use rectified linear units (ReLUs) by the ...
Neural networks with the Rectified Linear Unit (ReLU) nonlinearity are described by a vector of para...
In the past decade, deep learning became the prevalent methodology for predictive modeling thanks to...
Neural computation in biological and artificial networks relies on the nonlinear summation of many i...
Rectified linear units (ReLUs) have become the main model for the neural units in current deep learn...
We solve an open question from Lu et al. (2017), by showing that any target network with inputs in $...
Mechanistic interpretability aims to explain what a neural network has learned at a nuts-and-bolts l...
International audiencePoint lattices and their decoding via neural networks are considered in this p...
A new method is developed to determine a set of informative and refined interface assertions sati...
Deep neural networks often lack the safety and robustness guarantees needed to be deployed in safety...
"Artificial neural networks" provide an appealing model of computation. Such networks consist of an ...
We contribute to a better understanding of the class of functions that can be represented by a neura...
This dissertation explores applications of discrete geometry in mathematical neuroscience. We begin ...
We identify tessellation-filtering ReLU neural networks that, when composed with another ReLU netwo...
We contribute to a better understanding of the class of functions that is represented by a neural ne...
We can compare the expressiveness of neural networks that use rectified linear units (ReLUs) by the ...
Neural networks with the Rectified Linear Unit (ReLU) nonlinearity are described by a vector of para...
In the past decade, deep learning became the prevalent methodology for predictive modeling thanks to...
Neural computation in biological and artificial networks relies on the nonlinear summation of many i...
Rectified linear units (ReLUs) have become the main model for the neural units in current deep learn...
We solve an open question from Lu et al. (2017), by showing that any target network with inputs in $...
Mechanistic interpretability aims to explain what a neural network has learned at a nuts-and-bolts l...
International audiencePoint lattices and their decoding via neural networks are considered in this p...
A new method is developed to determine a set of informative and refined interface assertions sati...
Deep neural networks often lack the safety and robustness guarantees needed to be deployed in safety...
"Artificial neural networks" provide an appealing model of computation. Such networks consist of an ...
We contribute to a better understanding of the class of functions that can be represented by a neura...
This dissertation explores applications of discrete geometry in mathematical neuroscience. We begin ...