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seminars:anal

The seminar meets Wednesdays in WH-100E at 4:30 p.m. There are refreshments and snacks in WH-102 at 3:15.

The seminar is partly funded as one of Dean's Speaker Series in Harpur College (College of Arts and Sciences) at Binghamton University.

Organizers: Paul Loya, Xiangjin Xu, Lu Zhang, and Gang Zhou

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* **August 23th, Wednesday ** (3:30-4:30pm)

** Speaker **:

* **August 30th, Wednesday ** (3:30-5:00pm)

** Speaker **: Adam Weisblatt (Binghamton University)

** Abstract**: It is well known that the dirichlet problem in R^2 has a solution
when the boundary of the region is smooth. We will use geometric
techniques to construct an integral operator which gives the solution of
the dirichlet problem when the boundary has corners.

* **September 6th, Wednesday ** (3:30-4:30pm)

** Speaker **: Adam Weisblatt (Binghamton University)

** Abstract**: It is well known that the dirichlet problem in R^2 has a solution
when the boundary of the region is smooth. We will use geometric
techniques to construct an integral operator which gives the solution of
the dirichlet problem when the boundary has corners.

* **September 13th, Wednesday ** (3:30-4:30pm)

** Speaker **: Gang Zhou (Binghamton University)

** Abstract**: Polaron theory is a model of an electron in a crystal lattice. It is in the framework of nonequilibrium statistic mechanics, which becomes important in recent year because people can conduct better experiments. There are two different mathematical models for polaron: H. Frohlich proposed a quantum model in 1937; L. Landau and S. I. Pekar proposed a system of nonlinear PDEs in 1948. In a joint work of Rupert Frank, we proved that these two models are equivalent to certain orders.

* **September 20th, Wednesday ** (3:30-4:30pm) (Rosh Hashanah)

** Speaker**: Adam Weisblatt (Binghamton University)

** Abstract**: It is well known that the dirichlet problem in R^2 has a solution
when the boundary of the region is smooth. We will use geometric
techniques to construct an integral operator which gives the solution of
the dirichlet problem when the boundary has corners.

* **September 27th, Wednesday ** (3:30-4:30pm)

** Speaker**: Gang Zhou (Binghamton University)

** Abstract**: In this talk I will present the progresses made in the past few years on the evolution of surfaces under mean curvature flow. Our contributions were to prove the uniqueness of limit cylinder at the time of blowup and to unify different approaches by different parties, and to address some open problems, especially in four dimensional manifolds. These were made possible by applying different techniques learned from theoretical physics and mathematical physics. Joint works of Dan Knopf and Michael Sigal.

* **October 4th, Wednesday ** (3:30-4:30pm)

** Speaker**: Marius Beceanu (Albany University -SUNY)

** Abstract**: In this talk I shall present some new Strichartz-type estimates for wave and Klein–Gordon equations, with a few sample applications.

* **October 11th, Wednesday ** (3:30-4:30pm)

** Speaker**: Lu Zhang (Binghamton University)

** Abstract**: I will give a brief introduction to a type of the multi-parameter singular Randon transforms. Such type of operators was originally studied by Christ, Nagel, Stein and Wainger. The theory was
extended to the cases involving product kernels and general multi-parameter setting by B. Street and Stein.

* **October 18th, Wednesday ** (3:30-4:30pm)

** Speaker**: Philippe Sosoe (Cornell University)

** Abstract**: I will discuss a recent result, with T. Oh and N. Tzvetkov, proving that the distribution of the solution of a dispersive equation on the circle with random initial data according to some Gaussian measure remains regular at positive times. This result is optimal in two senses which will be clarified in the talk.

* **October 25th, Wednesday ** (3:30-4:30pm)

** Speaker**: Yakun Xi (University of Rochester)

** Abstract**: We use the Gauss-Bonnet theorem and the triangle comparison theorems of Rauch and Toponogov to show that on compact Riemannian surfaces of negative curvature, period integrals of eigenfunctions over geodesics go to zero at the rate of $O((\log \lambda)^{(-1/2)})$ if $\lambda$ are their frequencies. No such result is possible in the constant curvature case if the curvature is $≥ 0$.

* **November 1st, Wednesday ** (3:30-4:30pm)

** Speaker**: Kunal Sharma (Binghamton University)

** Abstract**: TBD

* **November 8th, Wednesday ** (3:30-4:30pm)

** Speaker**:

** Abstract**:

* **November 15th, Wednesday ** (3:30-4:30pm)

** Speaker**:

** Abstract**:

* **November 22rd, Wednesday ** (Thanksgiving)

** Speaker**:

** Abstract**:

* **November 29th, Wednesday ** (3:30-4:30pm)

** Speaker**:

** Abstract**:

* **December 6th, Wednesday ** (3:30-4:30pm)

** Speaker**:

** Abstract**:

seminars/anal.txt · Last modified: 2017/10/16 20:40 by xxu

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