A functional limit theorem for nested Karlin's occupancy scheme generated by discrete Weibull-like distributions

Abstract: Let (p k ) k∈N be a discrete probability distribution for which the counting function x → #{k ∈ N : p k ≥ 1/x} belongs to the de Haan class Π. Consider a deterministic weighted branching process generated by (p k ) k∈N . A nested Karlin's occupancy scheme is the sequence of Karlin balls-in-boxes schemes in which boxes of the jth level, j = 1, 2, . . . are identified with the jth generation individuals and the hitting probabilities of boxes are identified with the corresponding weights. The collection of balls … Show more

“…The Karlin model and its recent variations have attracted attentions in the literature of stochastic processes as they serve as simple models that exhibit long-range dependence. Notable variations and extensions include one to set-indexed models [11] that include and extend the set-indexed fractional Brownian motions [13], and another recent one to hierarchical models [14].…”

An aggregated model for Karlin stable processes

“…The Karlin model and its recent variations have attracted attentions in the literature of stochastic processes as they serve as simple models that exhibit long-range dependence. Notable variations and extensions include one to set-indexed models [11] that include and extend the set-indexed fractional Brownian motions [13], and another recent one to hierarchical models [14].…”

An aggregated model for Karlin stable processes