Some Results in a Correlated Random Walk

G. C. Jain

doi:10.4153/CMB-1971-062-x

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In connection with a statistical problem concerning the Galtontest Cśaki and Vincze [1] gave for an equivalent Bernoullian symmetric random walk the joint distribution of g and k, denoting respectively the number of positive steps and the number of times the particle crosses the origin, given that it returns there on the last step.

References

1. Cśaki, E. and Vincze, I., On some problems connected with the Galton-test, Publ. Math. Inst., Hungarian Acad. Sc., 6 (1961), 97-109.Google Scholar

2. Goldstein, S., On diffusion by discontinuous movements and on the telegraph equation, Quart. J. Mech. Appl. Math., 4 (1951), 129-156.Google Scholar

3. Seth, A., The correlated unrestricted random walk, J. Roy. Statist. Soc. Ser. B, (2) 25 (1963), 394-400.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Jain, G. C. 1973. On the Expected Number of Visits of a Particle before Absorption in a Correlated Random Walk. Canadian Mathematical Bulletin, Vol. 16, Issue. 3, p. 389.

MOHANTY, GOPAL 1979. Lattice Path Counting and Applications. p. 127.

Nain, R. B. and Sen, Kanwar 1980. Transition probability matrices for correlated random walks. Journal of Applied Probability, Vol. 17, Issue. 01, p. 253.

Nain, R. B. and Sen, Kanwar 1980. Transition probability matrices for correlated random walks. Journal of Applied Probability, Vol. 17, Issue. 1, p. 253.

Fujita, S. Okamura, Y. Blaisten, E. and Godoy, S. V. 1980. Study of a Lorentz-gas based on correlated walks. The Journal of Chemical Physics, Vol. 73, Issue. 9, p. 4569.

Nain, R. B. and Sen, Kanwar 1981. Fluctuation Results for Markov-Dependent Trials. SIAM Journal on Algebraic Discrete Methods, Vol. 2, Issue. 4, p. 341.

Weiss, George H. and Rubin, Robert J. 1982. Advances in Chemical Physics. Vol. 52, Issue. , p. 363.

Okamura, Y. Blaisten-Barojas, E. Godoy, S. V. Ulloa, S. E. and Fujita, S. 1982. Study of the correlated walks with reflecting walls. The Journal of Chemical Physics, Vol. 76, Issue. 1, p. 601.

Nain, R. B. and Sen, Kanwar 1982. Correction to a Result of Jain on a Correlated Random Walk. Canadian Mathematical Bulletin, Vol. 25, Issue. 4, p. 498.

Lal, Ram and Bhat, U. Narayan 1989. Some explicit results for correlated random walks. Journal of Applied Probability, Vol. 26, Issue. 04, p. 757.

Lal, Ram and Bhat, U. Narayan 1989. Some explicit results for correlated random walks. Journal of Applied Probability, Vol. 26, Issue. 4, p. 757.

Chen, Anyue and Renshaw, Eric 1992. The Gillis–Domb–Fisher correlated random walk. Journal of Applied Probability, Vol. 29, Issue. 4, p. 792.

Mohanty, S. G. 1994. Success runs of lengthk in Markov dependent trials. Annals of the Institute of Statistical Mathematics, Vol. 46, Issue. 4, p. 777.

Chen, Anyue and Renshaw, Eric 1994. The general correlated random walk. Journal of Applied Probability, Vol. 31, Issue. 04, p. 869.

Chen, Anyue and Renshaw, Eric 1994. The general correlated random walk. Journal of Applied Probability, Vol. 31, Issue. 4, p. 869.

Allaart, Pieter 2004. Optimal stopping rules for correlated random walks with a discount. Journal of Applied Probability, Vol. 41, Issue. 02, p. 483.

Allaart, Pieter 2004. Optimal stopping rules for correlated random walks with a discount. Journal of Applied Probability, Vol. 41, Issue. 2, p. 483.

Allaart, Pieter and Monticino, Michael 2008. Optimal Buy/Sell Rules for Correlated Random Walks. Journal of Applied Probability, Vol. 45, Issue. 1, p. 33.

Allaart, Pieter and Monticino, Michael 2008. Optimal Buy/Sell Rules for Correlated Random Walks. Journal of Applied Probability, Vol. 45, Issue. 01, p. 33.

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