$Transient aging in fractional Brownian and Langevin-equation motion$

Transient aging in fractional Brownian and Langevin-equation motion

Stochastic processes driven by stationary fractional Gaussian noise, that is, fractional Brownian motion and fractional Langevin-equation motion, are usually considered to be ergodic in the sense that, after an algebraic relaxation, time and ensemble averages of physical observables coincide. Recent...

Full description

Bibliographic Details
Main Authors:	Kursawe, J, Schulz, J, Metzler, R
Format:	Journal article
Published:	American Physical Society 2013

Similar Items

Fractional Langevin Equation Model for Characterization of Anomalous Brownian Motion from NMR Signals
by: Lisý Vladimír, et al.
Published: (2018-01-01)

Fuzzy stochastic differential equations driven by fractional Brownian motion
by: Hossein Jafari, et al.
Published: (2021-01-01)

Modelling intermittent anomalous diffusion with switching fractional Brownian motion
by: Michał Balcerek, et al.
Published: (2023-01-01)

Nonlocal fractional stochastic differential equations driven by fractional Brownian motion
by: Jingyun Lv, et al.
Published: (2017-07-01)

Exponential stability for neutral stochastic functional partial differential equations driven by Brownian motion and fractional Brownian motion
by: Xinwen Zhang, et al.
Published: (2018-08-01)

Langevin Dynamics Calculation of Brownian Coagulation Coefficient for Spherical Equal-size Aerosol Particles in Transient Regime
by: Fujimoto Toshiyuki, et al.
Published: (2021-01-01)

Memory-multi-fractional Brownian motion with continuous correlations
by: Wei Wang, et al.
Published: (2023-08-01)

Generalized fractional Brownian motion
by: Mounir Zili
Published: (2017-01-01)

Stochastic thermodynamics of fractional Brownian motion
by: S. Mohsen J. Khadem, et al.
Published: (2022-12-01)

Fractional Brownian Motion for a System of Fuzzy Fractional Stochastic Differential Equation
by: Kinda Abuasbeh, et al.
Published: (2022-01-01)

The Existence, Uniqueness, and Controllability of Neutral Stochastic Delay Partial Differential Equations Driven by Standard Brownian Motion and Fractional Brownian Motion
by: Dehao Ruan, et al.
Published: (2018-01-01)

Ultraslow scaled Brownian motion
by: Anna S Bodrova, et al.
Published: (2015-01-01)

On Fractional Langevin Equations with Stieltjes Integral Conditions
by: Binlin Zhang, et al.
Published: (2022-10-01)

Controllability of Hilfer fractional Langevin evolution equations
by: Haihua Wang, et al.
Published: (2023-05-01)

An Averaging Principle for Stochastic Differential Delay Equations with Fractional Brownian Motion
by: Yong Xu, et al.
Published: (2014-01-01)

Stochastic Volterra Equation Driven by Wiener Process and Fractional Brownian Motion
by: Zhi Wang, et al.
Published: (2013-01-01)

The existence and uniqueness of the solution of the integral equation driven by fractional Brownian motion
by: Kęstutis Kubilius
Published: (2000-12-01)

Abstract Functional Stochastic Evolution Equations Driven by Fractional Brownian Motion
by: Mark A. McKibben, et al.
Published: (2014-01-01)

Lyapunov Techniques for Stochastic Differential Equations Driven by Fractional Brownian Motion
by: Caibin Zeng, et al.
Published: (2014-01-01)

Synchronization of differential equations driven by linear multiplicative fractional Brownian motion
by: Wei Wei, et al.
Published: (2024-03-01)

On fractional Langevin equation involving two fractional orders in different intervals
by: Hamid Baghani, et al.
Published: (2019-11-01)

FRACTAL TIME-SERIES AND FRACTIONAL BROWNIAN-MOTION
by: Feder, J
Published: (1991)

On fractional Langevin equation involving two fractional orders in different intervals
by: Hamid Baghani, et al.
Published: (2019-11-01)

Transportation Inequalities for Coupled Fractional Stochastic Evolution Equations Driven by Fractional Brownian Motion
by: Wentao Zhan, et al.
Published: (2020-01-01)

Existence and Stability of Solutions of Fuzzy Fractional Stochastic Differential Equations with Fractional Brownian Motions
by: Elhoussain Arhrrabi, et al.
Published: (2021-01-01)

Impacts of Brownian motion and fractional derivative on the solutions of the stochastic fractional Davey-Stewartson equations
by: Mohammed Wael W., et al.
Published: (2023-06-01)

Approximate controllability of noninstantaneous impulsive Hilfer fractional integrodifferential equations with fractional Brownian motion
by: Hamdy M. Ahmed, et al.
Published: (2020-07-01)

On the wavelet transform of fractional Brownian motion
Published: (2003)

Some properties of fractional Brownian motion
by: Katsiaryna A. Haitsiukevich, et al.
Published: (2017-12-01)

Serotonergic Axons as Fractional Brownian Motion Paths: Insights Into the Self-Organization of Regional Densities
by: Skirmantas Janušonis, et al.
Published: (2020-06-01)

Absence of stationary states and non-Boltzmann distributions of fractional Brownian motion in shallow external potentials
by: Tobias Guggenberger, et al.
Published: (2022-01-01)

From brownian motion to schrodinger's equation /
by: 183874 Chung, Kai Lai, et al.
Published: (1995)

Fractional Langevin Equations with Nonseparated Integral Boundary Conditions
by: Khalid Hilal, et al.
Published: (2020-01-01)

On the Existence and Uniqueness of Solution to Fractional-Order Langevin Equation
by: Ahmed Salem, et al.
Published: (2020-01-01)

Measure of Noncompactness for Hybrid Langevin Fractional Differential Equations
by: Ahmed Salem, et al.
Published: (2020-05-01)

Existence of solution for fractional Langevin equation: Variational approach
by: César Torres Ledesma
Published: (2014-11-01)

On a generalization of fractional Langevin equation with boundary conditions
by: Zheng Kou, et al.
Published: (2022-01-01)

Fractional Langevin Equations with Nonlocal Integral Boundary Conditions
by: Ahmed Salem, et al.
Published: (2019-05-01)

The Euler approximation of stochastic differential equations driven by a fractional Brownian motion
by: Kęstutis Kubilius
Published: (1998-12-01)

Parameter Estimation for Stochastic Differential Equations Driven by Mixed Fractional Brownian Motion
by: Na Song, et al.
Published: (2014-01-01)