Symmetric (q,α)-Stable Distributions. Part I: First Representation
Abstract
The classic central limit theorem and α-stable distributions play a key role in probability theory, and also in Boltzmann-Gibbs (BG) statistical mechanics. They both concern the paradigmatic case of probabilistic independence of the random variables that are being summed. A generalization of the BG theory, usually referred to as nonextensive statistical mechanics and characterized by the index q (q=1 recovers the BG theory), introduces special (long range) correlations between the random variables, and recovers independence for q=1. Recently, a q-central limit theorem consistent with nonextensive statistical mechanics was established UmarovTsallisSteinberg which generalizes the classic Central Limit Theorem. In the present paper we introduce and study symmetric (q,α)-stable distributions. The case q=1 recovers the L\'evy α-stable distributions.
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