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Stationary distributions for dams with additive input and content-dependent release rate

Published online by Cambridge University Press:  01 July 2016

P. J. Brockwell
P. J. Brockwell*
Affiliation:
La Trobe University, Victoria
*
Now at Colorado State University, Fort Collins, Colorado.
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Abstract

Conditions are derived under which a probability measure on the Borel subsets of [0, ∞) is a stationary distribution for the content {Xt} of an infinite dam whose cumulative input {At} is a pure-jump Lévy process and whose release rate is a non-decreasing continuous function r(·) of the content. The conditions are used to find stationary distributions in a number of special cases, in particular when and when r(x) = xα and {At} is stable with index β ∊ (0, 1). In general if EAt, < ∞ and r(0 +) > 0 it is shown that the condition sup r(x)>EA1 is necessary and sufficient for a stationary distribution to exist, a stationary distribution being found explicitly when the conditions are satisfied. If sup r(x)>EA1 it is shown that there is at most one stationary distribution and that if there is one then it is the limiting distribution of {Xt} as t → ∞. For {At} stable with index β and r(x) = xα, α + β = 1, we show also that complementing results of Brockwell and Chung for the zero-set of {Xt} in the cases α + β < 1 and α + β > 1. We conclude with a brief treatment of the finite dam, regarded as a limiting case of infinite dams with suitably chosen release functions.

Keywords

DAM THEORYSTATIONARY DISTRIBUTIONADDITIVE PROCESSLÉVY MEASUREGENERAL RELEASE RULEMARKOV PROCESSGENERATORZERO SETFINITE DAM
Type
Research Article
Information
Advances in Applied Probability , Volume 9 , Issue 3 , September 1977 , pp. 645 - 663
Copyright
Copyright © Applied Probability Trust 1977 

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References

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