Spectral Theory of Differential Operators in Quantum Theory

Rescheduled for 2021 due to Covid-19

Workshop cancelled/postponed due to Covid-19

New dates: October 4 - 8, 2021

Spectral theory of differential operators is a rapidly developing area on the edge between differential equations, mathematical physics, and functional analysis, with applications in many branches of mathematics, mathematical physics and theoretical physics. This workshop focuses on recent developments in the spectral and scattering theory of self-adjoint and non-self-adjoint Schrödinger operators, Dirac operators, and other general elliptic differential operators, as well as the connections and interplay between spectral theory of differential operators and certain classes of analytic functions, among them the Dirichlet-to-Neumann map and more abstract Titchmarsh-Weyl m-functions from modern operator theory.
Applications will include resonances in quantum theory, quantum graphs and more general network problems, photonic crystals and quasicrystals.

Sept. 7, 2020
09:00 — 09:30
Registration and Welcome
10:30 — 11:00
Coffee / Tea Break
12:00 — 14:00
Lunch Break
15:00 — 16:00
Coffee / Tea Break
There is currently no participant information available for this event.
At a glance
Sept. 7, 2020 — Sept. 11, 2020
ESI Boltzmann Lecture Hall
Jussi Behrndt (TU Graz)
Fritz Gesztesy (Baylor U, Waco)
Ari Laptev (Imperial College, London)
Christiane Tretter (U Bern)