Phase transition for extremes of a family of stationary multiple-stable processes
Abstract
We investigate a family of multiple-stable processes that may exhibit either long-range or short-range dependence, depending on the parameters. There are two parameters for the processes, the memory parameter β∈(0,1) and the multiplicity parameter p∈ N. We investigate the macroscopic limit of extremes of the process, in terms of convergence of random sup-measures, for the full range of parameters. Our results show that (i) the extremes of the process exhibit long-range dependence when βp := pβ-p+1∈(0,1), with a new family of random sup-measures arising in the limit, (ii) the extremes are of short-range dependence when βp<0, with independently scattered random sup-measures arising in the limit, and (iii) there is a delicate phase transition at the critical regime βp = 0.
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