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2009 NEAR-EXTREMES AND RELATED POINT PROCESSES
N. Balakrishnan, E. Hashorva, J. Hüsler
Author Affiliations +
Albanian J. Math. 3(2): 63-74 (2009). DOI: 10.51286/albjm/1245190983

Abstract

Let Xi,i1 be a sequence of random variables with continuous distribution functions and let {N(t),t0} be a random counting process. Denote by Xi:N(t),iN(t) the i-th lower order statistics of X1,,XN(t),t0 and define a point process in by Mt,m(·):=i=1N(t)1(XN(t)m+1:N(t)Xi·),m. In this paper we derive distributional and asymptotical results for Mt,m(·). For special marginals of the point process we retrieve some general results for the number of m-th near-extremes.

Citation

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N. Balakrishnan. E. Hashorva. J. Hüsler. "NEAR-EXTREMES AND RELATED POINT PROCESSES." Albanian J. Math. 3 (2) 63 - 74, 2009. https://doi.org/10.51286/albjm/1245190983

Information

Published: 2009
First available in Project Euclid: 14 July 2023

Digital Object Identifier: 10.51286/albjm/1245190983

Subjects:
Primary: 60F15
Secondary: 60G70

Keywords: asymptotic results , Extreme value theory , Near-extremes , Point processes

Rights: Copyright © 2009 Research Institute of Science and Technology (RISAT)

Vol.3 • No. 2 • 2009
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