 On (c,p)-pseudostable Random VariablesJ. K. Misiewicz () and
G. Mazurkiewicz ()
Journal of Theoretical Probability, 2005, vol. 18, issue 4, 837-852 Abstract: In (Oleszkiewicz, Lecture Notes in Math. 1807), K. Oleszkiewicz defined a p-pseudostable random variable X as a symmetric random variable for which the following equation holds: $$\forall a,b \in \ IR \ \exists\ d(a,b)\ aX + bX^{\prime} \mathop{=}^{d} (|a|^p + |b|^p)^{1/p} X + d(a,b) G,$$ where G independent of X has normal distribution N(0,1), X′ denotes independent copy of X, and $$\mathop{=}^{\!\!\!\!d}$$ denotes equality of distributions. In this paper we define and study pseudostable random variables X for which the following equation holds: $$\forall a,b \in \ IR\ \exists d(a,b)\geq 0 \ aX + bX' \mathop{=}^{d} c(a,b) X + d(a,b) G_p,$$ where c is a quasi-norm on IR, G p independent of X is symmetric p-stable with the characteristic function e−|t|^p. This is a very natural generalization of the idea of p-pseudostable variables. In this notation X is p-pseudostable iff X is $$(\| \cdot \|_p, 2)$$ -pseudostable. In the paper we show that if X is (c,p)-pseudostable then there exists r>0, C, D ≥ 0 such that c(a,b) r =|a| r +|b| r and Ee e itX =exp{− C |t| p − D |t| r }. Keywords: Symmetric stable distribution; p-pseudostable variable; functional equation; multiplicatively periodic function. (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:spr:jotpro:v:18:y:2005:i:4:d:10.1007_s10959-005-7528-0 Ordering information: This journal article can be ordered from DOI: 10.1007/s10959-005-7528-0 Access Statistics for this article Journal of Theoretical Probability is currently edited by Andrea Monica More articles in Journal of Theoretical Probability from Springer |
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