Quasi-geometric infinite divisibility
Abstract
The object of this paper is to introduce and study the concept of quasi-geometric infinite divisibility for distributions on R+. These distributions arise as mixing distributions of (discrete) geometric infinitely divisible Poisson mixtures. Several characterizations and closure properties are presented. A connection between quasi-geometric infinite divisibility and log-convex (log-concave) distributions is established. A generalized notion of quasi-infinite divisibility is also discussed.
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