Anomalous decay of a prepared state due to non-Ohmic coupling to the continuum

Abstract

We study the decay of a prepared state E0 into a continuum Ek in the case of non-Ohmic models. This means that the coupling is |Vk,0| |Ek-E0|s-1 with s 1. We find that irrespective of model details there is a universal generalized Wigner time t0 that characterizes the evolution of the survival probability P0(t). The generic decay behavior which is implied by rate equation phenomenology is a slowing down stretched exponential, reflecting the gradual resolution of the bandprofile. But depending on non-universal features of the model a power-law decay might take over: it is only for an Ohmic coupling to the continuum that we get a robust exponential decay that is insensitive to the nature of the intra-continuum couplings. The analysis highlights the co-existence of perturbative and non-perturbative features in the dynamics. It turns out that there are special circumstances in which t0 is reflected in the spreading process and not only in the survival probability, contrary to the naive linear response theory expectation.