Continuity properties of the semi-group and its integral kernel in non-relativistic QED

Employing recent results on stochastic differential equations associated with the standard model of non-relativistic quantum electrodynamics by B. Guneysu, J. S. Moller, and the present author, we study the continuity of the corresponding semi-group between weighted vector-valued L-p-spaces, continuity properties of elements in the range of the semi-group, and the pointwise continuity of an operator-valued semi-group kernel. We further discuss the continuous dependence of the semi-group and its integral kernel on model parameters. All these results are obtained for Kato decomposable electrostatic potentials and the actual assumptions on the model are general enough to cover the Nelson model as well. As a corollary, we obtain some new pointwise exponential decay and continuity results on elements of low-energetic spectral subspaces of atoms or molecules that also take spin into account. In a simpler situation where spin is neglected, we explain how to verify the joint continuity of positive ground state eigenvectors with respect to spatial coordinates and model parameters. There are no smallness assumptions imposed on any model parameter.