RTG in Topology and Geometry to offer lectures by Gunther Uhlmann

This announcement has been updated. Please note the change in time and the addition of lecture locations.

The RTG in Topology and Geometry will be offering lectures by Gunther Uhlmann, University of Washington, in February. All lectures will run from 3:00 - 4:00 pm.

  • February 14, 2018 - Flying A Studios Room, UCen - Lecture 1: "Harry Potter's Cloak via Transformation Optics
    Can we make objects invisible? This has been a subject of human fascination for millennia in Greek mythology, movies, science fiction, etc. including the legend of Perseus versus Medusa and the more recent Star Trek and Harry Potter. In the last decade or so there have been several scientific proposals to achieve invisibility. We will introduce some of these in a non-technical fashion concentrating on the so-called “transformation optics” that has received the most attention in the scientific literature.
  • February 15, 2018 - Flying A Studios Room, UCen - Lecture 2: "Journey to the Center of the Earth"
    We will consider the inverse problem of determining the sound speed or index of refraction of a medium by measuring the travel times of waves going through the medium. This problem arises in global seismology in an attempt to determine the inner structure of the Earth by measuring travel times of earthquakes. It has also several applications in optics and medical imaging among others. The problem can be recast as a geometric problem: Can one determine the Riemannian metric of a Riemannian manifold with boundary by measuring the distance function between boundary points? This is the boundary rigidity problem. We will also consider the problem of determining the metric from the scattering relation, the so-called lens rigidity problem. The linearization of these problems involve the integration of a tensor along geodesics, similar to the X-ray transform.
  • February 16, 2018 - Broida Hall 1640 - Lecture 3: "Seeing Through Space Time"
    We consider inverse problems for the Einstein equation with a time-depending metric on a 4-dimensional globally hyperbolic Lorentzian manifold. We formulate the concept of active measurements for relativistic models. We do this by coupling Einstein equations with equations for scalar fields. The inverse problem we study is the question of whether the observations of the solutions of the coupled system in an open subset of the space-time with the sources supported in this set determines the properties of the metric in a larger domain. To study this problem we define the concept of light observation sets and show that knowledge of these sets determine the conformal class of the metric. This corresponds to passive observations from a distant area of space which is filled by light sources.
This event is supported by the RTG grant in Topology and Geometry funded by the National Science Foundation (NSF) and the Department of Mathematics

 

 

  • lecturers
  • Gunther Uhlmann
  • Geometry
  • Optics
  • Seismology
  • Relativity