Tempered relaxation equation and related generalized stable processes

Abstract

Fractional relaxation equations, as well as relaxation functions time-changed by independent stochastic processes have been widely studied (see, for example, MAI, STAW and GAR). We start here by proving that the upper-incomplete Gamma function satisfies the tempered-relaxation equation (of index ∈ (0,1)); thanks to this explicit form of the solution, we can then derive its spectral distribution, which extends the stable law. Accordingly, we define a new class of selfsimilar processes (by means of the n-times Laplace transform of its density) which is indexed by the parameter : in the special case where =1, it reduces to the stable subordinator. Therefore the parameter can be seen as a measure of the local deviation from the temporal dependence structure displayed in the standard stable case.