Tags: Dynamical systems

All Categories (1-20 of 70)

  1. A nonsmooth example: An approximation to the Jormungand climate model

    30 Nov 2015 | Contributor(s):: Jim Walsh

  2. A Survey of Grid Control and Optimization

    07 May 2015 | | Contributor(s):: Colin James Grudzien

    This is an introductory survey of how control problems arise on different time scales in electric grid transmission problems.  The set up and general form of such problems are considered, along with operational considerations.

  3. Alanna Hoyer-Leitzel

    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...

    https://mcrn.hubzero.org/members/1064

  4. Alberto Carrassi

    https://mcrn.hubzero.org/members/1106

  5. Alice Nadeau

    https://mcrn.hubzero.org/members/1096

  6. Amit Apte

    https://mcrn.hubzero.org/members/1039

  7. 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...

    https://mcrn.hubzero.org/events/details/588

  8. Anca R Radulescu

    https://mcrn.hubzero.org/members/1195

  9. Andrew Keane

    https://mcrn.hubzero.org/members/1319

  10. Anna von der Heydt

    https://mcrn.hubzero.org/members/1187

  11. Ben Zion Lazovsky

    https://mcrn.hubzero.org/members/1084

  12. Catalin Georgescu

    https://mcrn.hubzero.org/members/1098

  13. Chaotic Dynamical Systems: the Bernoulli Shift

    04 May 2016 | | Contributor(s):: Christopher KRT Jones

    This is the first part of a series of lectures on chaotic dynamics, and focuses on the Bernoulli shift. This short lecture series was part of the MCRN Mathematics of Climate Modelling Course taught at the University of North Carolina by Chris Jones in 2013. This course was a second year...

  14. Chaotic Dynamical Systems: the Horseshoe Map

    04 May 2016 | | Contributor(s):: Christopher KRT Jones

    This is the second part of a series of lectures on chaotic dynamics, and focuses on the Horseshoe Map. This short lecture series was part of the MCRN Mathematics of Climate Modelling Course taught at the University of North Carolina by Chris Jones in 2013. This course was a second year graduate...

  15. Colin James Grudzien

    I am a fifth year PhD student in the Mathematics Department at the University of North Carolina, Chapel Hill, and my adviser is Chris Jones.

    https://mcrn.hubzero.org/members/1034

  16. Complex Energy Systems

    07 May 2015 | | Contributor(s):: Michael Chertkov

    This is the opening guest lecture for the Electric Grid Focus Group.  Dr. Michael Chertkov of Los Alamos National Lab describes the statistical and mathematical problems arising in complex energy systems, including the electric grid and gas networks.  Systems with high penetration of...

  17. Complex Phytoplankton Dynamics: The Mathematical Perspective

    04 May 2015 | | Contributor(s):: Arjen Doelman, Antonios Zagaris

    Bibliography by Arjen Doelman and Antonios Zagaris to accompany tutorial lecture on Phytoplankton-Nutrient Modeling at the 2011 MBI Workshop on Ocean Ecologies and their Physical Habitats in a Changing Climate, and the follow-on lectures on Phytoplankton growth in oligotrophic oceans: Linear...

  18. Courtney Rose Quinn

    https://mcrn.hubzero.org/members/1167

  19. Deriving the Shallow Water Model in Geophysical Fluid Dynamics

    01 Jan 2013 | | Contributor(s):: Christopher KRT Jones

    These collected lectures go over key concepts in the derivation shallow water model as a conceptual model for ocean dynamics.  The attached PDF notes in the supporting documents expand on these lectures. This short lecture series was part of the MCRN Mathematics of Climate Modelling...

  20. Deriving the SWM Lecture 1: Conservation of Potential Vorticity

    04 May 2016 | | Contributor(s):: Christopher KRT Jones

    This lecture develops the conservation equation for potential vorticity in the shallow water model.