Abstract. We consider a cellular neural network (CNN) with a bias term z in the integer lattice Z2 on the plane R2. We impose a symmetric coupling between nearest neighbors, and also between next-nearest neighbors. Two parameters, a and ", are used to describe the weights between such interacting cells. We study patterns that can exist as stable equilibria. In particular, the relationship between mosaic patterns and the parameter space (z; a; ") can be completely characterized. This, in turn, addresses the so-called learning problem in CNNs. The complexities of mosaic patterns are also addressed. Key words. cellular neural networks, pattern formation, spatial chaos AMS subject classications. Primary, 34C35; Secondary, 94C9
The paper introduces a class of third-order nonsymmetric Cellular Neural Networks (CNNs), and shows ...
The paper analyzes bifurcations and complex dynamics in a class of nearly symmetric standard cellula...
AbstractThis study investigates the complexity of the global set of output patterns for one-dimensio...
This work investigates mosaic patterns for the one-dimensional cellular neural networks with various...
This work investigates binary pattern formations of two-dimensional standard cellular neural network...
[[abstract]]This work investigates the complexity of one-dimensional cellular neural network mosaic ...
Stationary pattern formation in ensembles of coupled bistable elements is investigated both analytic...
Abstruct-The aim of this three part tutorial is to focus the reader’s attention to a new exciting be...
This study describes the spatial disorder of one-dimensional Cellular Neural Networks (CNN) with a b...
Cellular Neural Networks (CNNs) have been investigated by many researchers. Additionally, many kinds...
There are many studies of coupled chaotic systems. In these systems, various kinds of phenomena are ...
Abstract. The effect of boundary conditions on the global dynamics of cellular neural networks (CNNs...
In this paper, we study the distribution of attraction basins of multiple equilibrium points of cell...
This investigation will describe the spatial disorder of one-dimensional Cellular Neural Net-works (...
which permits unrestricted use, distribution, and reproduction in any medium, provided the original ...
The paper introduces a class of third-order nonsymmetric Cellular Neural Networks (CNNs), and shows ...
The paper analyzes bifurcations and complex dynamics in a class of nearly symmetric standard cellula...
AbstractThis study investigates the complexity of the global set of output patterns for one-dimensio...
This work investigates mosaic patterns for the one-dimensional cellular neural networks with various...
This work investigates binary pattern formations of two-dimensional standard cellular neural network...
[[abstract]]This work investigates the complexity of one-dimensional cellular neural network mosaic ...
Stationary pattern formation in ensembles of coupled bistable elements is investigated both analytic...
Abstruct-The aim of this three part tutorial is to focus the reader’s attention to a new exciting be...
This study describes the spatial disorder of one-dimensional Cellular Neural Networks (CNN) with a b...
Cellular Neural Networks (CNNs) have been investigated by many researchers. Additionally, many kinds...
There are many studies of coupled chaotic systems. In these systems, various kinds of phenomena are ...
Abstract. The effect of boundary conditions on the global dynamics of cellular neural networks (CNNs...
In this paper, we study the distribution of attraction basins of multiple equilibrium points of cell...
This investigation will describe the spatial disorder of one-dimensional Cellular Neural Net-works (...
which permits unrestricted use, distribution, and reproduction in any medium, provided the original ...
The paper introduces a class of third-order nonsymmetric Cellular Neural Networks (CNNs), and shows ...
The paper analyzes bifurcations and complex dynamics in a class of nearly symmetric standard cellula...
AbstractThis study investigates the complexity of the global set of output patterns for one-dimensio...