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On entrance times of a homogeneous N-dimensional random walk: an identity

Published online by Cambridge University Press:  14 July 2016

Abstract

Present developments in computer performance evaluation require detailed analysis of N-dimensional random walks on the set of lattice points in the first 2N-ant of Recent research has shown that for the two-dimensional case the inherent mathematical problem can often be formulated as a boundary value problem of the Riemann–Hilbert type. The paper is concerned with a derivation and analysis of an identity for the first entrance times distributions into the boundary of such random walks. The identity formulates a relation between these distributions and the zero-tuples of the kernel of the random walk; the kernel contains all the information concerning the structure of the random walk in the interior of its stage space. For the two-dimensional case the identity is resolved and explicit expressions for the entrance times distributions are obtained.

Type
Part 8 - Random Walks, Graphs and Networks
Copyright
Copyright © Applied Probability Trust 1988 

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References

[1] Baccelli, F. (1986) Exponential martingales and Wald's formulas for two-queue networks. J. Appl. Prob. 23, 812819.CrossRefGoogle Scholar
[2] Cohen, J. W. (1982) The Single Server Queue, 2nd edn. North-Holland, Amsterdam.Google Scholar
[3] Cohen, J. W. (1987) On entrance time distributions. Proc. Workshop Appl. Math. Performance/Reliability Models of Computer Communication Systems, ed. Iazeolla, G., North-Holland, Amsterdam.Google Scholar
[4] Cohen, J. W. (1986) Entrance times of a homogeneous, semi-bounded N-dimensional random walk; an identity. Preprint, University of Utrecht.Google Scholar
[5] Cohen, J. W. and Boxma, O. J. (1983) Boundary Value Problems in Queueing System Analysis., Math. Studies 79, North-Holland, Amsterdam.Google Scholar
[6] Greenwood, P. E. and Shared, M. (1977) Fluctuations of random walks in Rd and storage systems. Adv. Appl. Prob. 9, 566587.Google Scholar
[7] Mogulskii, A. A. and Pecherskii, E. A. (1977) On the first exit time out of a semigroup in Rm for a random walk. Theory Prob. Appl. 22, 818825.Google Scholar