An invariance principle for semimartingale reflecting Brownian motions in domains with piecewise smooth boundaries.

Semimartingale reflecting Brownian motions (SRBMs) living in the closures of domains with piecewise smooth boundaries are of interest in applied probability because of their role as heavy traffic approximations for some stochastic networks. In this paper, assuming certain conditions on the domains and directions of reflection, a perturbation result, or invariance principle, for SRBMs is proved. This provides sufficient conditions for a process that satisfies the definition of an SRBM, except for small random perturbations in the defining conditions, to be close in distribution to an SRBM. A crucial ingredient in the proof of this result is an oscillation inequality for solutions of a perturbed Skorokhod problem. We use the invariance principle to show weak existence of SRBMs under mild conditions. We also use the invariance principle, in conjunction with known uniqueness results for SRBMs, to give some sufficient conditions for validating approximations involving (i) SRBMs in convex polyhedrons with a constant reflection vector field on each face of the polyhedron, and (ii) SRBMs in bounded domains with piecewise smooth boundaries and possibly nonconstant reflection vector fields on the boundary surfaces.

[1]  D. Gilbarg,et al.  Elliptic Partial Differential Equa-tions of Second Order , 1977 .

[2]  Ruth J. Williams,et al.  Diffusion approximations for open multiclass queueing networks: sufficient conditions involving state space collapse , 1998, Queueing Syst. Theory Appl..

[3]  P. Dupuis,et al.  On oblique derivative problems for fully nonlinear second-order elliptic PDE’s on domains with corners , 1991 .

[4]  Ruth J. Williams,et al.  Existence and Uniqueness of Semimartingale Reflecting Brownian Motions in Convex Polyhedrons , 1996 .

[5]  Jim Dai,et al.  Correctional Note to "Existence and Uniqueness of Semimartingale Reflecting Brownian Motions in Convex Polyhedrons" , 2006 .

[6]  Ruth J. Williams,et al.  A boundary property of semimartingale reflecting Brownian motions , 1988 .

[7]  A. Shiryaev,et al.  Limit Theorems for Stochastic Processes , 1987 .

[8]  R. J. Williams,et al.  Existence and uniqueness of semimartingale reflecting Brownian motions in an orthant , 1993 .

[9]  P. Dupuis,et al.  On Lipschitz continuity of the solution mapping to the Skorokhod problem , 1991 .

[10]  R. J. Williams,et al.  Fluid model for a network operating under a fair bandwidth-sharing policy , 2004, math/0407057.

[11]  S. Agmon The Relaxation Method for Linear Inequalities , 1954, Canadian Journal of Mathematics.

[12]  P. Dupuis,et al.  SDEs with Oblique Reflection on Nonsmooth Domains , 2008 .

[13]  Robert J. Plemmons,et al.  Nonnegative Matrices in the Mathematical Sciences , 1979, Classics in Applied Mathematics.

[14]  S. Ethier,et al.  Markov Processes: Characterization and Convergence , 2005 .

[15]  A. Hoffman On approximate solutions of systems of linear inequalities , 1952 .

[16]  J. Harrison,et al.  Reflected Brownian Motion on an Orthant , 1981 .

[17]  Wanyang Dai,et al.  A heavy traffic limit theorem for a class of open queueing networks with finite buffers , 1999, Queueing Syst. Theory Appl..

[18]  R. J. Williams,et al.  State space collapse and diffusion approximation for a network operating under a fair bandwidth sharing policy , 2009, 0910.3821.

[19]  Gerald B. Folland,et al.  Real Analysis: Modern Techniques and Their Applications , 1984 .

[20]  P. Bassanini,et al.  Elliptic Partial Differential Equations of Second Order , 1997 .

[21]  Ruth J. Williams,et al.  An invariance principle for semimartingale reflecting Brownian motions in an orthant , 1998, Queueing Syst. Theory Appl..

[22]  I. J. Schoenberg,et al.  The Relaxation Method for Linear Inequalities , 1954, Canadian Journal of Mathematics.