Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Lewis, P. A. W.
1985.
SOME SIMPLE MODELS FOR CONTINUOUS VARIATE TIME SERIES1.
JAWRA Journal of the American Water Resources Association,
Vol. 21,
Issue. 4,
p.
635.
Tavares, L. Valadares
1987.
European Journal of Operational Research,
Vol. 28,
Issue. 3,
p.
397.
Chernick, M. R.
Daley, D. J.
and
Littlejohn, R. P.
1988.
A time-reversibility relationship between two Markov chains with exponential stationary distributions.
Journal of Applied Probability,
Vol. 25,
Issue. 02,
p.
418.
Chernick, M. R.
Daley, D. J.
and
Littlejohn, R. P.
1988.
A time-reversibility relationship between two Markov chains with exponential stationary distributions.
Journal of Applied Probability,
Vol. 25,
Issue. 2,
p.
418.
Arnold, Barry C.
and
Hallett, J.Terry
1989.
A characterization of the pareto process among stationary stochastic processes of the form Xn = c min(Xn−1, Yn).
Statistics & Probability Letters,
Vol. 8,
Issue. 4,
p.
377.
Alpuim, M. Teresa
1989.
An extremal markovian sequence.
Journal of Applied Probability,
Vol. 26,
Issue. 02,
p.
219.
Lewis, Peter A. W.
and
McKenzie, Ed
1991.
Minification processes and their transformations.
Journal of Applied Probability,
Vol. 28,
Issue. 01,
p.
45.
Littlejohn, R. P.
1992.
Discrete minification processes and reversibility.
Journal of Applied Probability,
Vol. 29,
Issue. 1,
p.
82.
Adke, S.R.
and
Balakrishna, N.
1992.
Estimation of the mean of some stationary markov sequences.
Communications in Statistics - Theory and Methods,
Vol. 21,
Issue. 1,
p.
137.
Littlejohn, R. P.
1994.
A reversibility relationship for two Markovian time series models by stationary exponential tailed distribution.
Journal of Applied Probability,
Vol. 31,
Issue. 2,
p.
575.
Kalamkar, V. A.
1995.
Minification processes with discrete marginals.
Journal of Applied Probability,
Vol. 32,
Issue. 3,
p.
692.
Littlejohn, R.P.
1996.
A reversibility relationship for two Markovian time series models with stationary geometric tailed distribution.
Stochastic Processes and their Applications,
Vol. 64,
Issue. 1,
p.
127.
Anderson, Dale N.
and
Arnold, Barry C.
1996.
Modelling gas release event behaviour in hazardous waste tanks.
Environmental and Ecological Statistics,
Vol. 3,
Issue. 4,
p.
281.
Sreehari, M.
and
Kalamkar, V.A.
1997.
Modelling some stationary Markov processes and related characterizations.
Journal of Statistical Planning and Inference,
Vol. 63,
Issue. 2,
p.
363.
Balakrishna, N.
1998.
Estimation for the semipareto processes.
Communications in Statistics - Theory and Methods,
Vol. 27,
Issue. 9,
p.
2307.
Hall, Peter
Peng, Liang
and
Yao, Qiwei
2002.
Moving-maximum models for extrema of time series.
Journal of Statistical Planning and Inference,
Vol. 103,
Issue. 1-2,
p.
51.
Jayakumar, K.
and
Pillai, R.N.
2002.
A class of stationary Markov processes.
Applied Mathematics Letters,
Vol. 15,
Issue. 4,
p.
513.
Balakrishna, N.
and
Jacob, T. M.
2003.
Parameter Estimation in Minification Processes.
Communications in Statistics - Theory and Methods,
Vol. 32,
Issue. 11,
p.
2139.
Jayakumar, K.
2004.
Soft Methodology and Random Information Systems.
p.
235.
Ristić, Miroslav M.
2006.
Stationary bivariate minification processes.
Statistics & Probability Letters,
Vol. 76,
Issue. 5,
p.
439.