Analysis and Applied Mathematics Seminar
Bing-Yu Zhang
University of Cincinnati
Boundary Integral Operator and Its Applications
Abstract: In the past three decades, harmonic analysis has played important roles in the rapid advances of the study of nonlinear dispersive wave equations. In particular, many new tools have been developed to establish various well-posedness results for the pure initial value problems of nonlinear dispersive wave equations. However, how those harmonic analysis based tools can be used effectively to study non-homogeneous boundary value problems of nonlinear dispersive wave equations is still yet to be investigated. In this talk, we will introduce the concept of the boundary integral operators and show how they play important roles in studying non-homogeneous bound- ary value problems of nonlinear dispersive wave equations. In particular, we will demonstrate through examples of the KdV equation and the Schr ̈odinger equation how the boundary integral operators can enable us to use those harmonic analysis based tools to study non-homogeneous boundary value problems effectively.
Monday November 9, 2015 at 4:00 PM in SEO 636