Abstract: Recently a Hardy-type inequality for two dimensional
waveguides in magnetic fields was established by Tomas Ekholm and
Hynek Kovarik. Their theoretical result allows to conclude that
eigenvalues will not appear for sufficiently weak curvature of the
waveguide, but the proof does not give a good idea about the actual
constants involved. We will present numerical examples of this
phenomenon, and discuss the size of the constant in the Hardy-type
inequality.
