TY  - GEN
A1  - Guggenberger, Tobias
A1  - Pagnini, Gianni
A1  - Vojta, Thomas
A1  - Metzler, Ralf
T1  - Fractional Brownian motion in a finite interval
BT  - correlations effect depletion or accretion zones of particles near boundaries
T2  - Postprints der Universität Potsdam Mathematisch-Naturwissenschaftliche Reihe
N2  - Fractional Brownian motion (FBM) is a Gaussian stochastic process with stationary, long-time correlated increments and is frequently used to model anomalous diffusion processes. We study numerically FBM confined to a finite interval with reflecting boundary conditions. The probability density function of this reflected FBM at long times converges to a stationary distribution showing distinct deviations from the fully flat distribution of amplitude 1/L in an interval of length L found for reflected normal Brownian motion. While for superdiffusion, corresponding to a mean squared displacement (MSD) 〈X² (t)〉 ⋍ tᵅ with 1 < α < 2, the probability density function is lowered in the centre of the interval and rises towards the boundaries, for subdiffusion (0 < α < 1) this behaviour is reversed and the particle density is depleted close to the boundaries. The MSD in these cases at long times converges to a stationary value, which is, remarkably, monotonically increasing with the anomalous diffusion exponent α. Our a priori surprising results may have interesting consequences for the application of FBM for processes such as molecule or tracer diffusion in the confines of living biological cells or organelles, or other viscoelastic environments such as dense liquids in microfluidic chambers.
T3  - Zweitveröffentlichungen der Universität Potsdam : Mathematisch-Naturwissenschaftliche Reihe - 755 
KW  - anomalous diffusion
KW  - fractional Brownian motion
KW  - reflecting boundary conditions
Y1  - 2019
U6  - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:kobv:517-opus4-436665
SN  - 1866-8372
IS  - 755
ER  - 
TY  - JOUR
A1  - Guggenberger, Tobias
A1  - Pagnini, Gianni
A1  - Vojta, Thomas
A1  - Metzler, Ralf
T1  - Fractional Brownian motion in a finite interval
BT  - correlations effect depletion or accretion zones of particles near boundaries
JF  - New Journal of Physics
N2  - Fractional Brownian motion (FBM) is a Gaussian stochastic process with stationary, long-time correlated increments and is frequently used to model anomalous diffusion processes. We study numerically FBM confined to a finite interval with reflecting boundary conditions. The probability density function of this reflected FBM at long times converges to a stationary distribution showing distinct deviations from the fully flat distribution of amplitude 1/L in an interval of length L found for reflected normal Brownian motion. While for superdiffusion, corresponding to a mean squared displacement (MSD) 〈X² (t)〉 ⋍ tᵅ with 1 < α < 2, the probability density function is lowered in the centre of the interval and rises towards the boundaries, for subdiffusion (0 < α < 1) this behaviour is reversed and the particle density is depleted close to the boundaries. The MSD in these cases at long times converges to a stationary value, which is, remarkably, monotonically increasing with the anomalous diffusion exponent α. Our a priori surprising results may have interesting consequences for the application of FBM for processes such as molecule or tracer diffusion in the confines of living biological cells or organelles, or other viscoelastic environments such as dense liquids in microfluidic chambers.
KW  - anomalous diffusion
KW  - fractional Brownian motion
KW  - reflecting boundary conditions
Y1  - 2019
U6  - https://doi.org/10.1088/1367-2630/ab075f
SN  - 1367-2630
VL  - 21
PB  - Deutsche Physikalische Gesellschaft ; IOP, Institute of Physics
CY  - Bad Honnef und London
ER  - 
TY  - JOUR
A1  - Vojta, Thomas
A1  - Skinner, Sarah
A1  - Metzler, Ralf
T1  - Probability density of the fractional Langevin equation with reflecting walls
JF  - Physical review : E, Statistical, nonlinear and soft matter physics
N2  - We investigate anomalous diffusion processes governed by the fractional Langevin equation and confined to a finite or semi-infinite interval by reflecting potential barriers. As the random and damping forces in the fractional Langevin equation fulfill the appropriate fluctuation-dissipation relation, the probability density on a finite interval converges for long times towards the expected uniform distribution prescribed by thermal equilibrium. In contrast, on a semi-infinite interval with a reflecting wall at the origin, the probability density shows pronounced deviations from the Gaussian behavior observed for normal diffusion. If the correlations of the random force are persistent (positive), particles accumulate at the reflecting wall while antipersistent (negative) correlations lead to a depletion of particles near the wall. We compare and contrast these results with the strong accumulation and depletion effects recently observed for nonthermal fractional Brownian motion with reflecting walls, and we discuss broader implications.
Y1  - 2019
U6  - https://doi.org/10.1103/PhysRevE.100.042142
SN  - 2470-0045
SN  - 2470-0053
VL  - 100
IS  - 4
PB  - American Physical Society
CY  - College Park
ER  -