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(7월 4일) Characterization of Probability Distributions in Terms of Their Moments

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Characterization of Probability Distributions in Terms of Their Moments

날짜

2019.07.04 (목) 14:00

연사

Jordan Stoyanov (불가리아 과학원)

장소

우리별 세미나실(E3-2, 2201호)

개요:

Our discussion will be on distributions, continuous or discrete, with finite all moments of positive integer order. Any such a distribution is either uniquely determined by its moments (M-determinate), or it is non-unique (M-indeterminate). We are going to explain why some distributions are M-determinate, and others are M-indeterminate. The uniqueness, or M-determinacy, is an important property from both theoretical and applied point of view. In particular, the M-determinacy is an essential requirement for the validity of a fundamental limit theorem. We will describe the current state of arts and concentrate on a variety of checkable conditions which are either sufficient or necessary for uniqueness or for non-uniqueness (Cramer, Carleman, Hardy, Krein, Lin, rate of growth of moments, etc.)

Besides the moments, we will exploit the cumulants/semi-invariants to establish a non-conventional limit theorem. We illustrate ideas and results by examples based on distributions such that Normal, Poisson, Exponential, Lognormal. It time permits, some challenging open questions will be outlined.  

연사악력:

Honorary Professor, Bulgarian Academy of Sciences, Sofia, Bulgaria
Visiting Professor, Shandong University, Jinan, China
Formerly with Newcastle University, UK (1998-2015)
Author of 80 papers and 5 books including Counterexamples in Probability (Third ed.) Dover Publications, New York, December 2013