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The method of cumulants for the normal approximation

Hanna Döring, Sabine Jansen, Kristina Schubert

2022Probability Surveys18 citationsDOIOpen Access PDF

Abstract

The survey is dedicated to a celebrated series of quantitave results, developed by the Lithuanian school of probability, on the normal approximation for a real-valued random variable. The key ingredient is a bound on cumulants of the type | j (X)| j! 1+ / j-2 , which is weaker than Cramr's condition of finite exponential moments. We give a selfcontained proof of some of the "main lemmas" in a book by Saulis and Statuleviius (1989), and an accessible introduction to the Cramr-Petrov series. In addition, we explain relations with heavy-tailed Weibull variables, moderate deviations, and mod-phi convergence. We discuss some methods for bounding cumulants such as summability of mixed cumulants and dependency graphs, and briefly review a few recent applications of the method of cumulants for the normal approximation.

Topics & Concepts

CumulantMathematicsBounding overwatchEdgeworth seriesRandom variableApplied mathematicsSeries (stratigraphy)GaussianCalculus (dental)StatisticsPhysicsPaleontologyArtificial intelligenceBiologyQuantum mechanicsComputer scienceMedicineDentistryMathematical Approximation and IntegrationAdvanced Harmonic Analysis ResearchMathematical Dynamics and Fractals
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