__Claremont Graduate University__ | __Claremont McKenna__ | __Harvey Mudd__ | __Pitzer__ | __Pomona__ | __Scripps__

Proudly Serving Math Community at the Claremont Colleges Since 2007

Copyright © 2011 Claremont Center for the Mathematical Sciences

When

Start: 09/12/2012 - 4:15pm

End : 09/12/2012 - 5:15pm

End : 09/12/2012 - 5:15pm

Category

Colloquium

Speaker

Susan Friedlander, University of Southern California

Abstract

Abstract: We discuss an advection-diffusion equation that has been proposed by Keith Moffatt as a model for the Geodynamo. Even though the drift velocity can be strongly singular, we prove that the critically diffusive PDE is globally well-posed. We examine the nonlinear instability of a particular steady state and use continued fractions to construct a lower bound on the growth rate of a solution. This lower bound grows as the inverse of the diffusivity coefficient. In the Earth’s fluid core this coefficient is expected to be very small. Thus the model does indeed produce very strong Geodynamo action. This work is joint with Vlad Vicol.

Where

Millikan 134, Pomona College

Attachment | Size |
---|---|

Friedlander.pdf | 105.64 KB |