Neural networks and particularly Deep learning have been comparatively little studied from the theoretical point of view. Conversely, Mathematical Morphology is a discipline with solid theoretical foundations. We combine these domains to propose a new type of neural architecture that is theoretically more explainable. We introduce a Binary Morphological Neural Network (BiMoNN) built upon the convolutional neural network. We design it for learning morphological networks with binary inputs and outputs. We demonstrate an equivalence between BiMoNNs and morphological operators that we can use to binarize entire networks. These can learn classical morphological operators and show promising results on a medical imaging application
Mathematical morphology is a powerful tool for image processing tasks. The main difficulty in design...
During recent years, the renaissance of neural networks as the major machine learning paradigm and m...
International audienceThis paper analyses both nonlinear activation functions and spatial max-poolin...
Neural networks and particularly Deep learning have been comparatively little studied from the theor...
International audienceIn the last ten years, Convolutional Neural Networks (CNNs) have formed the ba...
International audienceTraining and running deep neural networks (NNs) often demands a lot of computa...
Over the past decade, Convolutional Networks (ConvNets) have renewed the perspectives of the researc...
Morphological neural networks (MNNs) can be characterized as a class of artificial neural networks t...
Mathematical morphology is a theory and technique applied to collect features like geometric and top...
A classical approach to designing binary image operators is Mathematical Morphology (MM). We propose...
A morphological neural network is generally defined as a type of artificial neural network that perf...
Mathematical morphology is a discipline that provides a formal framework for the analysis and manipu...
Morphological operators are nonlinear transformations commonly used in image processing. Their theor...
Morphological neural networks (MNNs) are a class of artificial neural networks whose operations can ...
International audienceThis paper aims at providing an overview of the use of mathematical morphology...
Mathematical morphology is a powerful tool for image processing tasks. The main difficulty in design...
During recent years, the renaissance of neural networks as the major machine learning paradigm and m...
International audienceThis paper analyses both nonlinear activation functions and spatial max-poolin...
Neural networks and particularly Deep learning have been comparatively little studied from the theor...
International audienceIn the last ten years, Convolutional Neural Networks (CNNs) have formed the ba...
International audienceTraining and running deep neural networks (NNs) often demands a lot of computa...
Over the past decade, Convolutional Networks (ConvNets) have renewed the perspectives of the researc...
Morphological neural networks (MNNs) can be characterized as a class of artificial neural networks t...
Mathematical morphology is a theory and technique applied to collect features like geometric and top...
A classical approach to designing binary image operators is Mathematical Morphology (MM). We propose...
A morphological neural network is generally defined as a type of artificial neural network that perf...
Mathematical morphology is a discipline that provides a formal framework for the analysis and manipu...
Morphological operators are nonlinear transformations commonly used in image processing. Their theor...
Morphological neural networks (MNNs) are a class of artificial neural networks whose operations can ...
International audienceThis paper aims at providing an overview of the use of mathematical morphology...
Mathematical morphology is a powerful tool for image processing tasks. The main difficulty in design...
During recent years, the renaissance of neural networks as the major machine learning paradigm and m...
International audienceThis paper analyses both nonlinear activation functions and spatial max-poolin...