Reflected Brownian motion

In probability theory, reflected Brownian motion (or regulated Brownian motion,^[1]^[2] both with the acronym RBM) is a Wiener process in a space with reflecting boundaries.^[3]

RBMs have been shown to describe queueing models experiencing heavy traffic^[2] as first proposed by Kingman^[4] and proven by Iglehart and Whitt.^[5]^[6]

Definition

A d–dimensional reflected Brownian motion Z is a stochastic process on $\mathbb {R} _{+}^{d}$ uniquely defined by

a d–dimensional drift vector μ
a d×d non-singular covariance matrix Σ and
a d×d reflection matrix R.^[7]

where X(t) is an unconstrained Brownian motion and^[8]

Z(t) = X(t) + R Y(t)

with Y(t) a d–dimensional vector where

Y is continuous and non–decreasing with Y(0) = 0
Y_j only increases at times for which Z_j = 0 for j = 1,2,...,d
Z(t) ∈ $\mathbb {R} _{+}^{d}$ , t ≥ 0.

The reflection matrix describes boundary behaviour. In the interior of $\scriptstyle \mathbb R^d_+$ the process behaves like a Wiener process, on the boundary "roughly speaking, Z is pushed in direction R^j whenever the boundary surface $\scriptstyle \{ z \in \mathbb R^d_+ : z_j=0\}$ is hit, where R^j is the jth column of the matrix R."^[8]

Stability conditions

Stability conditions are known for RBMs in 1, 2, and 3 dimensions. "The problem of recurrence classification for SRBMs in four and higher dimensions remains open."^[8] In the special case where R is an M-matrix then necessary and sufficient conditions for stability are^[8]

R is a non-singular matrix and
R⁻¹μ < 0.

Marginal and stationary distribution

One dimension

The marginal distribution (transient distribution) of a one-dimensional Brownian motion starting at 0 restricted to positive values (a single reflecting barrier at 0) with drift μ and variance σ² is

\mathbb {P} (Z(t)\leq z)=\Phi \left({\frac {z-\mu t}{\sigma t^{1/2}}}\right)-e^{2\mu z/\sigma ^{2}}\Phi \left({\frac {-z-\mu t}{\sigma t^{1/2}}}\right)

for all t ≥ 0, (with Φ the cumulative distribution function of the normal distribution) which yields (for μ < 0) when taking t → ∞ an exponential distribution^[2]

\mathbb {P} (Z<z)=1-e^{2\mu z/\sigma ^{2}}.

For fixed t, the distribution of Z(t) coincides with the distribution of the running maximum M(t) of the Brownian motion,

Z(t)\sim M(t)=\sup _{s\in [0,t]}X(s).

But be aware that the distributions of the processes as a whole are very different. In particular, M(t) is increasing in t, which is not the case for Z(t).

The heat kernel for reflected Brownian motion at $p_b$ :

$f(x,p_{b})={\frac {e^{-((x-u)/a)^{2}/2}+e^{-((x+u-2p_{b})/a)^{2}/2}}{a(2\pi )^{1/2}}}$

For the plane above $x\geq p_{b}$

Multiple dimensions

The stationary distribution of a reflected Brownian motion in multiple dimensions is tractable analytically when there is a product form stationary distribution,^[9] which occurs when the process is stable and^[10]

2 \Sigma = RD + DR'

where D = diag(Σ). In this case the probability density function is^[7]

p(z_1,z_2,\ldots,z_d) = \prod_{k=1}^d \eta_k e^{-\eta_k z_k}

where η_k = 2μ_kγ_k/Σ_kk and γ = R⁻¹μ. Closed-form expressions for situations where the product form condition does not hold can be computed numerically as described below in the simulation section.

Simulation

One dimension

In one dimension the simulated process is the absolute value of a Wiener process. The following MATLAB program creates a sample path.^[11]

%rbm.m
n=10^4; h=10^(-3); t=h.*(0:n); mu=-1;
X=zeros(1,n+1); M=X; B=X;
B(1)=3; X(1)=3;
for k=2:n+1
  Y=sqrt(h)*randn; U=rand(1);
  B(k)=B(k-1)+mu*h-Y;
  M=(Y + sqrt(Y^2-2*h*log(U)))/2;
  X(k)=max(M-Y,X(k-1)+h*mu-Y);
end
subplot(2,1,1)
plot(t,X,'k-');
subplot(2,1,2)
plot(t,X-B,'k-');

The error involved in discrete simulations has been quantified.^[12]

Multiple dimensions

QNET allows simulation of steady state RBMs.^[13]^[14]^[15]

Other boundary conditions

Feller described possible boundary condition for the process^[16]^[17]^[18]

absorption^[16] or killed Brownian motion,^[19] a Dirichlet boundary condition
instantaneous reflection,^[16] as described above a Neumann boundary condition
elastic reflection, a Robin boundary condition
delayed reflection^[16] (the time spent on the boundary is positive with probability one)
partial reflection^[16] where the process is either immediately reflected or is absorbed
sticky Brownian motion.^[20]

References

↑ Dieker, A. B. (2011). "Reflected Brownian Motion". Wiley Encyclopedia of Operations Research and Management Science. doi:10.1002/9780470400531.eorms0711. ISBN 9780470400531.
1 2 3 Harrison, J. Michael (1985). Brownian Motion and Stochastic Flow Systems (PDF). John Wiley & Sons. ISBN 0471819395.
↑ Veestraeten, D. (2004). "The Conditional Probability Density Function for a Reflected Brownian Motion". Computational Economics. 24 (2): 185–207. doi:10.1023/B:CSEM.0000049491.13935.af.
↑ Kingman, J. F. C. (1962). "On Queues in Heavy Traffic". Journal of the Royal Statistical Society. Series B (Methodological). Wiley. 24 (2): 383–392. JSTOR 2984229.
↑ Iglehart, Donald L.; Whitt, Ward (1970). "Multiple Channel Queues in Heavy Traffic. I". Advances in Applied Probability. Applied Probability Trust. 2 (1): 150–177. doi:10.2307/3518347. JSTOR 3518347. Retrieved 30 Nov 2012.
↑ Iglehart, Donald L.; Ward, Whitt (1970). "Multiple Channel Queues in Heavy Traffic. II: Sequences, Networks, and Batches" (PDF). Advances in Applied Probability. Applied Probability Trust. 2 (2): 355–369. doi:10.2307/1426324. JSTOR 1426324. Retrieved 30 Nov 2012.
1 2 Harrison, J. M.; Williams, R. J. (1987). "Brownian models of open queueing networks with homogeneous customer populations" (PDF). Stochastics. 22 (2): 77. doi:10.1080/17442508708833469.
1 2 3 4 Bramson, M.; Dai, J. G.; Harrison, J. M. (2010). "Positive recurrence of reflecting Brownian motion in three dimensions" (PDF). The Annals of Applied Probability. 20 (2): 753. doi:10.1214/09-AAP631.
↑ Harrison, J. M.; Williams, R. J. (1992). "Brownian Models of Feedforward Queueing Networks: Quasireversibility and Product Form Solutions". The Annals of Applied Probability. 2 (2): 263. doi:10.1214/aoap/1177005704. JSTOR 2959751.
↑ Harrison, J. M.; Reiman, M. I. (1981). "On the Distribution of Multidimensional Reflected Brownian Motion". SIAM Journal on Applied Mathematics. 41 (2): 345–361. doi:10.1137/0141030.
↑ Kroese, Dirk P.; Taimre, Thomas; Botev, Zdravko I. (2011). Handbook of Monte Carlo Methods. John Wiley & Sons. p. 202. ISBN 1118014952.
↑ Asmussen, S.; Glynn, P.; Pitman, J. (1995). "Discretization Error in Simulation of One-Dimensional Reflecting Brownian Motion". The Annals of Applied Probability. 5 (4): 875. doi:10.1214/aoap/1177004597. JSTOR 2245096.
↑ Dai, Jim G.; Harrison, J. Michael (1991). "Steady-State Analysis of RBM in a Rectangle: Numerical Methods and A Queueing Application". The Annals of Applied Probability. Institute of Mathematical Statistics. 1 (1): 16–35. doi:10.1214/aoap/1177005979. JSTOR 2959623.
↑ Dai, Jiangang "Jim" (1990). "Steady-state analysis of reflected Brownian motions: characterization, numerical methods and queueing applications (Ph. D. thesis)" (PDF). Stanford University. Dept. of Mathematics. Retrieved 5 December 2012. |chapter= ignored (help)
↑ Dai, J. G.; Harrison, J. M. (1992). "Reflected Brownian Motion in an Orthant: Numerical Methods for Steady-State Analysis" (PDF). The Annals of Applied Probability. Institute of Mathematical Statistics. 2 (1): 65–86. doi:10.1214/aoap/1177005771. JSTOR 2959654.
1 2 3 4 5 Skorokhod, A. V. (1962). "Stochastic Equations for Diffusion Processes in a Bounded Region. II". Theory of Probability & Its Applications. 7: 3–1. doi:10.1137/1107002.
↑ Feller, W. (1954). "Diffusion processes in one dimension". Transactions of the American Mathematical Society. 77: 1–0. doi:10.1090/S0002-9947-1954-0063607-6.
↑ Engelbert, H. J.; Peskir, G. (2012). "Stochastic Differential Equations for Sticky Brownian Motion" (PDF). Probab. Statist. Group Manchester Research Report (5).
↑ Chung, K. L.; Zhao, Z. (1995). "Killed Brownian Motion". From Brownian Motion to Schrödinger's Equation. Grundlehren der mathematischen Wissenschaften. 312. p. 31. doi:10.1007/978-3-642-57856-4_2. ISBN 978-3-642-63381-2.
↑ Itō, K.; McKean, H. P. (1996). "Time changes and killing". Diffusion Processes and their Sample Paths. p. 164. doi:10.1007/978-3-642-62025-6_6. ISBN 978-3-540-60629-1.

Queueing theory

Single queueing nodes	D/M/1 queue M/D/1 queue M/D/c queue M/M/1 queue Burke's theorem M/M/c queue M/M/∞ queue M/G/1 queue Pollaczek–Khinchine formula Matrix analytic method M/G/k queue G/M/1 queue G/G/1 queue Kingman's formula Lindley equation Fork–join queue Bulk queue

Arrival processes	Poisson process Markovian arrival process Rational arrival process

Queueing networks	Jackson network Traffic equations Gordon–Newell theorem Mean value analysis Buzen's algorithm Kelly network G-network BCMP network

Service policies	FIFO LIFO Processor sharing Round-robin Shortest job first Shortest remaining time

Key concepts	Continuous-time Markov chain Kendall's notation Little's law Product-form solution Balance equation Quasireversibility Flow-equivalent server method Arrival theorem Decomposition method Beneš method

Limit theorems	Fluid limit Mean field theory Heavy traffic approximation Reflected Brownian motion

Extensions	Fluid queue Layered queueing network Polling system Adversarial queueing network Loss network Retrial queue

Information systems	Data buffer Erlang (unit) Erlang distribution Flow control (data) Message queue Network congestion Network scheduler Pipeline (software) Quality of service Scheduling (computing) Teletraffic engineering

Category

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Reflected Brownian motion

Definition

Stability conditions

Marginal and stationary distribution

One dimension

Multiple dimensions

Simulation

One dimension

Multiple dimensions

Other boundary conditions

See also

References