Ter­min

For­schungs­se­mi­nar "Kom­ple­xe Quan­ten­sys­te­me": Va­len­tin Kuß­maul (Stutt­gart) -- Point­wi­se bounds on ei­gen­states in non-re­la­ti­vi­stic quan­tum field theo­ry

Ort: D2.314

We establish subsolution estimates for vector-valued Sobolev functions obeying a very mild subharmonicity condition. Our results generalize and improve a well-known subsolution estimate in the scalar-valued case, and, most importantly, they apply to models from non-relativistic quantum field theory: for eigenstates of the Nelson and Pauli-Fierz models we show that an L2-exponential bound in terms of a Lipschitz function implies the corresponding pointwise exponential bound. This is joint work with M. Griesemer.