# Difference between revisions of "PDE Geometric Analysis seminar"

Line 19: | Line 19: | ||

|October 15 | |October 15 | ||

|[http://www.math.umn.edu/~polacik/ Peter Polacik (U of M)] | |[http://www.math.umn.edu/~polacik/ Peter Polacik (U of M)] | ||

− | |[[#Peter Polacik ( | + | |[[#Peter Polacik (University of Minnesota)| |

− | + | Exponential separation between positive and sign-changing solutions and its applications]] | |

|Zlatos | |Zlatos | ||

|- | |- | ||

Line 41: | Line 41: | ||

− | ===Peter Polacik ( | + | ===Peter Polacik (University of Minnesota)=== |

− | '' | + | '' Exponential separation between positive and sign-changing solutions and its applications'' |

− | + | In linear nonautonomous second-order parabolic equations, the exponential separation refers to the exponential decay of any sign-changing solution relative to any positive solution. In this lecture, after summarizing key results on exponential separation, we show how it can be effectively used in studies of some nonlinear parabolic problems. |

## Revision as of 04:07, 22 September 2012

The seminar will be held in room B115 of Van Vleck Hall on Mondays from 3:30pm - 4:30pm, unless indicated otherwise.

### Previous PDE/GA seminars

# Seminar Schedule Fall 2012

date | speaker | title | host(s) |
---|---|---|---|

September 17 | Bing Wang (UW Madison) |
On the regularity of limit space |
local |

October 15 | Peter Polacik (U of M) |
Exponential separation between positive and sign-changing solutions and its applications |
Zlatos |

# Abstracts

### Bing Wang (UW Madison)

*On the regularity of limit space*

This is a joint work with Gang Tian. In this talk, we will discuss how to improve regularity of the limit space by Ricci flow. We study the structure of the limit space of a sequence of almost Einstein manifolds, which are generalizations of Einstein manifolds. Roughly speaking, such manifolds are the initial manifolds of some normalized Ricci flows whose scalar curvatures are almost constants over space-time in the L1-sense, Ricci curvatures are bounded from below at the initial time. Under the non-collapsed condition, we show that the limit space of a sequence of almost Einstein manifolds has most properties which is known for the limit space of Einstein manifolds. As applications, we can apply our structure results to study the properties of K¨ahler manifolds.

### Peter Polacik (University of Minnesota)

* Exponential separation between positive and sign-changing solutions and its applications*

In linear nonautonomous second-order parabolic equations, the exponential separation refers to the exponential decay of any sign-changing solution relative to any positive solution. In this lecture, after summarizing key results on exponential separation, we show how it can be effectively used in studies of some nonlinear parabolic problems.