On the spectrum determined growth assumption and the perturbation ofC0semigroups

This short paper gives useful information concerning properties of perturbations of infinitesimal generators of analytic semigroups. In particular, it is shown that the spectrum determined growth assumption is retained not only under bounded perturbations but also under a class of unbounded perturb

A lower bound is given for the harmonic mean of the growth in a finite undirected graph 1 in terms of the eigenvalues of the Laplacian of 1. For a connected graph, this bound is tight if and only if the graph is distance-regular. Bounds on the diameter of a ``sphere-regular'' graph follow. Finally,

A spectrum of the \(K^{1} \Sigma^{+}, v=0\) state of \({ }^{13} \mathrm{C}^{18} \mathrm{O}\), excited by XUV-laser radiation, has been recorded. It turns out to be an exemplary case of a strongly perturbed rotational manifold without direct spectroscopic information on the perturber state. The quest