A broadly applicable method for the identification of bifurcations in complex, multi-parameter dynamical systems
16 Jun 2015 | | Contributor(s):: Daniel K Wells, Adilson Motter, William L Kath
Traditional numerical bifurcation methods seek to identify and classify solutions in systems with small numbers of parameters. These methods have become canonical tools in determining how solutions of dynamical systems depend upon parameters. Of particular interest are bifurcation points, which...
MS (2012), PhD (2014) Unversity of Minnesota I was an MCRN Ed Lorenz Postdoctoral Fellow at Bowdoin College. Now I'm a Visiting Assistant Professor at Mount Holyoke...
Mar 07 2015
AMS Spring Eastern Sectional Meeting
Georgetown University, Washington, DCMarch 7-8, 2015 (Saturday - Sunday)Meeting #1107 (website)Saturday March 7, 2015, 2:00 p.m.-4:20 p.m.: Special Session on Conceptual Mathematical Models in...
I am a Ph.D. candidate at the University of Guelph in the field of Applied mathematics. My work includes the application of bifurcation theory to energy balance models of the climate of the Earth....
I received a PhD in physics from UC Berkeley in 1989. After that I moved into applied math via a series of postdocs. I spent 23 years in the applied math dept. at Northwestern University before...
Jan 10 2015
Mathematics of Planet Earth Invited Paper Session and additional talks at Joint Mathematics Meeting
JOINT MATHEMATICS MEETINGSSaturday January 10, 2015, 6:00 p.m.: Informal MCRN MeetingLocation: IMA table at the Open House of the Institutes in Mathematical Sciences Texas Ballroom, Salons A &...
Midwest Mathematics and Climate Conference
12 May 2015 |
The conference is sponsored by the National Science Foundation, Institute of Mathematics and Its Applications, the Office of Research,College of Liberal Arts and Sciences, and the Department of Mathematics, Department of Geography/Atmospheric Science Program, and The...
NBRIT Webinar 1/19/16: Peter Ashwin presents on Tipping Points for Parameter Shifts
20 Jan 2016 | | Contributor(s):: Peter Ashwin
Abstract: It seems that a mathematical definition for tipping points or critical transitions in general may be very difficult owing to the wide range of phenomena that are usefully classified as tipping points. However in some contexts a definition that goes beyond classical bifurcations may be...
Nonsmooth Discussion, dBBCK, Chapter 2.5-2.6
10 Dec 2015 | | Contributor(s):: Jonathan Hahn, Kaitlin Hill
Discussion of Chapter 2.4 - 2.6 of Piecewise-smooth Dynamical Systems by di Bernardo, Budd, Champneys, and Kowalczyk. Topics include structural stability, types of discontinuity-induced bifurcation, discontinuity mappings, and numerical methods for simulating nonsmooth systems.
Powerpoint Intro to Potential Analysis
16 Sep 2015 | | Contributor(s):: Darren Anthony Marotta
A technique to detect the number of states in a geophysical system attained from recorded time series. Potential Analysis estimates the degree of a polynomial, which determines the number of states in the time series. Changes in the number of states represent bifurcations of the system.
Unstable equilibria in complex models
17 Sep 2015 | | Contributor(s):: Jan Sieber