On the spectral invariants for the Dirichlet to Neumann map in the unit ball.

In this talk we consider the Dirichlet to Neumann map (D-N) for the unit sphere in $R^3$. When we are sufficiently far from the origin, the spectrum of such an operator consists of eigenvalue clusters around the natural numbers. The distribution of the corresponding scaled eigenvalue shifts has an asymptotic expansion when the label of the cluster goes to infinity. The asymptotic expansion consists of distributions called spectral invariants. By using the averaging method, asymptotics of the Berezin symbol of the D-N map and a suitable symbol calculus, we compute the first terms of such an expansion in terms of the Radon transform (averages along geodesis of the unit sphere) of derivatives of the function that encodes the conductivity properties of the media in the unit ball.