Add to ORKGAbstract. Exponential relaxation to equilibrium is a typical property of physical systems, but inhomogeneities are known to distort the exponential relaxation curve, leading to a wide variety of relaxation patterns. Power law relaxation is related to fractional derivatives in the time variable. More general relaxation patterns are considered here, and the corresponding semi-Markov processes are studied. Our method, based on Bernstein functions, unifies three different approaches in the literature
We propose a phenomenological approach to relaxation in disordered systems which is modelled after t...
We study the relaxation process in normal and anomalous diffusion regimes for systems described by ...
It is well known that ergodic theory can be used to formally prove a form of relaxation to microcano...
In this note, we show how an initial value problem for a relaxation process governed by a differenti...
The first-order differential equation of exponential relaxation can be generalized by using either t...
From the point of view of the general theory of the hyper-Bessel operators, we consider a particular...
In this paper we introduce a very simple model exhibiting slow relaxation, typical of glassy systems...
We demonstrate the advantage of using the so-called generalized exponential (GEX) function for the a...
In the frame of a new probabilistic approach to relaxation, the scenario of relaxation leading to th...
The first-order differential equation of exponential relaxation can be generalized by replacing th...
A mapping of non-extensive statistical mechanics with non-additivity parameter q ≠ 1 into Gi...
We study the properties of two new relaxation labeling schemes described in terms of differential eq...
In this study we have analytically obtained the relaxation function in terms of rotational correlati...
It is proved that kinetic equations containing non-integer integrals and derivatives appear in the r...
In order to describe relaxation processes not obeying an exponential law a model of a self-similar r...
We propose a phenomenological approach to relaxation in disordered systems which is modelled after t...
We study the relaxation process in normal and anomalous diffusion regimes for systems described by ...
It is well known that ergodic theory can be used to formally prove a form of relaxation to microcano...
In this note, we show how an initial value problem for a relaxation process governed by a differenti...
The first-order differential equation of exponential relaxation can be generalized by using either t...
From the point of view of the general theory of the hyper-Bessel operators, we consider a particular...
In this paper we introduce a very simple model exhibiting slow relaxation, typical of glassy systems...
We demonstrate the advantage of using the so-called generalized exponential (GEX) function for the a...
In the frame of a new probabilistic approach to relaxation, the scenario of relaxation leading to th...
The first-order differential equation of exponential relaxation can be generalized by replacing th...
A mapping of non-extensive statistical mechanics with non-additivity parameter q ≠ 1 into Gi...
We study the properties of two new relaxation labeling schemes described in terms of differential eq...
In this study we have analytically obtained the relaxation function in terms of rotational correlati...
It is proved that kinetic equations containing non-integer integrals and derivatives appear in the r...
In order to describe relaxation processes not obeying an exponential law a model of a self-similar r...
We propose a phenomenological approach to relaxation in disordered systems which is modelled after t...
We study the relaxation process in normal and anomalous diffusion regimes for systems described by ...
It is well known that ergodic theory can be used to formally prove a form of relaxation to microcano...