Markov Properties of k-Record Processes via Order Statistics

Abstract

The theory of k-record values (Type 2 k-records) plays an important role in the study of partial extremes and in statistical inference based on record data. A common approach reduces the analysis of k-records associated with a distribution function F to that of ordinary records from the transformed distribution F1:k(x)=1-(1-F(x))k. This representation is widely used to derive distributional and inferential results, often without an explicit construction of the underlying stochastic mechanism, and relies on a structural property of order statistics that, although classical, is typically invoked without proof. We give a direct derivation of the probabilistic structure of k-record processes based on the sequence of running order statistics Un=Xn-k+1:n, the k-th largest among the first n observations. We show that (Un) forms a Markov chain with respect to its natural filtration, with an explicit transition kernel. The key step is a conditional-independence property of upper order statistics, which we isolate and prove: conditionally on Un, the k-1 observations exceeding Un are distributed as order statistics from the distribution truncated at Un, independently of the whole past trajectory. Under continuity of F, the usual Type 2 k-record times coincide almost surely with the record times of (Un). This yields a transparent construction of the k-record process as the record process of a Markov chain, and classical distributional results -- including the representation through F1:k and the joint density of the first m k-record values -- are recovered in a unified framework. We also treat the exponential case, in which the k-record values form a random walk with independent exponential increments and Gamma-distributed marginals, and record a corresponding characterisation of the exponential distribution.

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