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On the determination of a distribution by its median residual life function: a functional equation

Published online by Cambridge University Press:  14 July 2016

Ramesh C. Gupta  and
Eric S. Langford
Ramesh C. Gupta*
Affiliation:
University of Maine at Orono
Eric S. Langford*
Affiliation:
University of Maine at Orono
*
Postal address: Department of Mathematics, University of Maine, Orono, ME 04469, U.S.A.
∗∗ Present address: Department of Mathematics, California State University, Chico, CA 959929–0525, U.S.A.
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Abstract

In reliability studies, it is well known that the mean residual life function determines the distribution function uniquely. In this paper we show how closely we can determine a distribution when its median residual life function M[S | t] is known. This amounts to solving the functional equation , where R is the reliability function. We actually study a more general functional equation f(φ(t)) = sf(t) called Schroder's equation. It is shown that, under mild assumptions on φ, the solution is of the form f(t) = f0(t)k(log f0 (t)), where f0 is a well-behaved particular solution which can be constructed and k is a periodic function; thus the solution is not unique. Two examples are solved to illustrate the method. Finally, these examples are used to solve the problem of linear M[S | t] studied by Schmittlein and Morrison. As an extra benefit, all of our results hold equally well for the more general sth percentile residual life function.

Keywords

STH PERCENTILE RESIDUAL LIFE FUNCTIONSCHRODER'S FUNCTIONAL EQUATIONRELIABILITY FUNCTIONSLINEAR STH PERCENTILE RESIDUAL LIFE FUNCTIONPARETO DISTRIBUTION
Type
Research Papers
Information
Journal of Applied Probability , Volume 21 , Issue 1 , March 1984 , pp. 120 - 128
Copyright
Copyright © Applied Probability Trust 1984 

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