Boolean automata isolated cycles and tangential double-cycles dynamics

TL;DR

This paper investigates how the structure of Boolean automata networks, especially feedback cycles and their intersections, influences their long-term dynamical behaviors, providing insights into fundamental properties of interaction networks.

Contribution

It offers a survey of results on the impact of feedback cycles and their intersections on the dynamics of Boolean automata networks, highlighting their role in shaping asymptotic behaviors.

Findings

Feedback cycles significantly influence network dynamics.

Intersections between feedback cycles affect global behavior.

Structural properties determine asymptotic dynamics.

Abstract

Our daily social and political life is more and more impacted by social networks. The functioning of our living bodies is deeply dependent on biological regulation networks such as neural, genetic, and protein networks. And the physical world in which we evolve, is also structured by systems of interacting particles. Interaction networks can be seen in all spheres of existence that concern us, and yet, our understanding of interaction networks remains severely limited by our present lack of both theoretical and applied insight into their clockworks. In the past, efforts at understanding interaction networks have mostly been directed towards applications. This has happened at the expense of developing understanding of the generic and fundamental aspects of interaction networks. Intrinsic properties of interaction networks (eg the ways in which they transmit information along entities, their ability to produce this or that kind of global dynamical behaviour depending on local interactions) are thus still not well understood. Lack of fundamental knowledge tends to limit the innovating power of applications. Without more theoretical fundamental knowledge, applications cannot evolve deeply and become more impacting. Hence, it is necessary to better apprehend and comprehend the intrinsic properties of interaction networks, notably the relations between their architecture and their dynamics and how they are affected by and set in time. In this chapter, we use the elementary mathematical model of Boolean automata networks as a formal archetype of interaction networks. We survey results concerning the role of feedback cycles and the role of intersections between feedback cycles, in shaping the asymptotic dynamical behaviours of interaction networks.