For a topology of dynamical systems

GIUNTI, MARCO
2016-01-01

Abstract

Dynamical systems are mathematical objects meant to formally capture the evolution of deterministic systems. Although no topological constraint is usually imposed on their state spaces, there is prima facie evidence that the topological properties of dynamical systems might naturally depend on their dynamical features. This paper aims to prepare the grounds for a systematic investigation of such dependence, by exploring how the underlying dynamics might naturally induce a corresponding topology.
2016
Inglese
Towards a post-Bertalanffy systemics
CONTEMPORARY SYSTEMS THINKING
Fortunato T. Arlecchi, et al.
Gianfranco Minati, Mario R. Abram, Eliano Pessa
81
87
7
Springer
Berlin
GERMANIA
978-3-319-24391-7
978-3-319-24389-4
WOS:000577068300007
Esperti anonimi
internazionale
scientifica
Deterministic dynamical system, Dynamical system on a monoid, Topology, Dynamically induced topology
info:eu-repo/semantics/bookPart
Mazzola, C; Giunti, Marco
2 Contributo in Volume::2.1 Contributo in volume (Capitolo o Saggio)
2
268
reserved
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