AUTHOR=Caravelli Francesco 

TITLE=Trajectories Entropy in Dynamical Graphs with Memory

JOURNAL=Frontiers in Robotics and AI

VOLUME=3

YEAR=2016

URL=https://www.frontiersin.org/journals/robotics-and-ai/articles/10.3389/frobt.2016.00018

DOI=10.3389/frobt.2016.00018

ISSN=2296-9144

ABSTRACT=<p>In this paper, we investigate the application of non-local graph entropy in evolving and dynamical graphs. The measure is based upon the notion of Markov diffusion on a graph and relies on the entropy applied to trajectories originating at a specific node. In particular, we study the model of reinforcement–decay graph dynamics, which leads to scale-free graphs. We find that the node entropy characterizes the structure of the network in the two parameter phase–space describing the dynamical evolution of the weighted graph. We then apply an adapted version of the entropy measure to purely memristive circuits. We provide evidence that meanwhile in the case of DC voltage, the entropy based on the forward probability is enough to characterize the graph properties; in the case of AC voltage generators, one needs to consider both forward- and backward-based transition probabilities. We provide also evidence that the entropy highlights the self-organizing properties of memristive circuits, which re-organizes itself to satisfy the symmetries of the underlying graph.<xref ref-type="fn" rid="fn1"><sup>1</sup></xref></p>