Product of Tensors and Description of Networks

Abstract

Any kind of network can be naturally represented by a Directed Acyclic Graph (DAG); additionally, activation functions can determine the reaction of each node of the network with respect to the signal(s) incoming. We study the characterization of the signal distribution in a network under the lens of tensor algebra. More specifically, we describe every activation function as tensor distributions with respect to the nodes, called activation tensors. The distribution of the signal is encoded in the total tensor of the network. We formally prove that the total tensor can be obtained by computing the Batthacharya-Mesner Product (BMP), an n-ary operation for tensors of order n, on the set of the activation tensors properly ordered and processed via two basic operations, that we call blow and forget. Our theoretical framework can be validated through the related code developed in Python.