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Simple random walk statistics. Part II: Continuous time results

Published online by Cambridge University Press:  14 July 2016

W. Böhm*
Affiliation:
University of Economics, Vienna
W. Panny*
Affiliation:
University of Economics, Vienna
*
Postal address: Department of Statistics, University of Economics, Augasse 2–6, A-1090 Wien, Austria.
Postal address: Department of Statistics, University of Economics, Augasse 2–6, A-1090 Wien, Austria.

Abstract

In this paper various statistics for randomized random walks and their distributions are presented. The distributional results are derived by means of a limiting procedure applied to the pertaining discrete time process, which has been considered in part I of this work (Katzenbeisser and Panny 1996). This basic approach, originally due to Meisling (1958), seems to offer certain technical advantages, since it avoids the use of Laplace transforms and is even simpler than Feller's randomization technique.

Type
Research Papers
Copyright
Copyright © Applied Probability Trust 1996 

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References

Böhm, W. and Mohanty, S. G. (1990) Discretization of Markovian queueing systems. Technical Report. Department of Mathematical Statistics, University of Economics, Vienna.Google Scholar
Böhm, W. and Mohanty, S. G. (1993) The transient solution of M/M/1 queues under (M, N)-policy. A combinatorial approach. T Stat. Plann. Inference 34, 2333.Google Scholar
Böhm, W. and Mohanty, S. G. (1994) On discrete time Markovian N-policy queues involving batches. Sankhya A 56, 120.Google Scholar
Dwass, M. (1967) Simple random walk and rank order statistics. Ann. Math. Statist. 38, 10421053.Google Scholar
Feller, W. (1971) An Introduction to Probability Theory and its Applications. Vol. 2, 2nd. edn. Wiley, New York.Google Scholar
Sen, Kanwar, Jain, J. L. and Gupta, J. M. (1993) Lattice path approach to transient solution of M/M/1 with (0, K) control policy. J. Stat. Plann. Inference 34, 259268.Google Scholar
Katzenbeisser, W. and Panny, W. (1996) Simple random walk statistics. Part I: Discrete time results. J. Appl. Prob. 33, 311330.Google Scholar
Jain, J. L. and Gupta, J. M. (1993) Combinatorial approach to Markovian queues. J. Stat. Plann. Inference 34, 269280.Google Scholar
Meisling, T. (1958) Discrete-time queueing theory. J. Operat. Res. Soc. Am. 6, 96105.Google Scholar
Mohanty, S. G. and Panny, W. (1989) A discrete-time analogue of the M/M/1 queue and the transient solution: An analytic approach. In Limit Theorems in Probability and Statistics. Pécs (Hungary), Colloq. Math. Soc. Janos Bolyai 57, 417–124.Google Scholar
Mohanty, S. G. and Panny, W. (1990) A discrete-time analogue of the M/M/1 queue and the transient solution: A geometric approach. Sankhya A, 52, 364370.Google Scholar
Mohanty, S. G., Parthasarathy, P. R. and Sharaf Ali, M. (1990) On the transient solution of a discrete queue. Technical Report. Mathematics and Statistics Department, McMaster University, Hamilton.Google Scholar