On the structure of multi-layer cellular neural networks: Complexity between two layers

Abstract

Let Y be the solution space of an n-layer cellular neural network, and let Y(i) and Y(j) be the hidden spaces, where 1 ≤ i, j ≤ n. (Y(n) is called the output space.) The classification and the existence of factor maps between two hidden spaces, that reaches the same topological entropies, are investigated in [Ban et al., J.~Differential Equations 252, 4563-4597, 2012]. This paper elucidates the existence of factor maps between those hidden spaces carrying distinct topological entropies. For either case, the Hausdorff dimension Y(i) and Y(j) can be calculated. Furthermore, the dimension of Y(i) and Y(j) are related upon the factor map between them.