Title: | Breaking Chaos |
Speaker: | Ryan Huddy Graduate Student Mathematics Clarkson University Potsdam, New York |
Abstract: | In mathematics, chaos can be defined as a deterministic dynamical system which has aperiodic long-term behavior and exhibits sensitive dependence on initial conditions. Surprisingly, such systems can be coupled together and made to synchronize. If their communication is delayed, this chaotic behavior can also be broken and stable periodic behaviors will emerge from the coupled system. Join me as we study the basics of chaotic systems and explore some examples of the synchronization of chaos (with and without delay). |
Location: | Palenske 227 |
Date: | 4/11/2013 |
Time: | 3:30 PM |
@abstract{MCS:Colloquium:RyanHuddy:2013:4:11, author = "{Ryan Huddy}", title = "{Breaking Chaos}", address = "{Albion College Mathematics and Computer Science Colloquium}", month = "{11 April}", year = "{2013}" }