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Statistics
A Journal of Theoretical and Applied Statistics
Volume 52, 2018 - Issue 2
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Original Articles

Orthogonal polynomials in the cumulative Ord family and its application to variance bounds

Georgios AfendrasDepartment of Biostatistics and Jacobs School of Medicine and Biomedical Sciences, The State University of New York at Buffalo, Buffalo, NY, USACorrespondence[email protected]
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,
Narayanaswamy BalakrishnanDepartment of Mathematics and Statistics, McMaster University, Hamilton, ON, CanadaORCID Iconhttp://orcid.org/0000-0001-5842-8892View further author information
ORCID Icon &
Nickos PapadatosDepartment of Mathematics, Section of Statistics and O.R., University of Athens, Athens, GreeceView further author information
Pages 364-392 | Received 12 Dec 2016, Accepted 15 Nov 2017, Published online: 29 Nov 2017

References

  • Ord JK. Families of frequency distributions. London: Griffin; 1972.
  • Johnson NL, Kemp AW, Kotz S. Univariate discrete distributions. 3rd ed. Wiley: New York; 2005.
  • Afendras G, Papadatos N, Papathanasiou V. An extended Stein-type covariance identity for the Pearson family with applications to lower variance bounds. Bernoulli. 2011;17:507–529. doi: 10.3150/10-BEJ282
  • Sudheesh KK, Luisa T. Moment identity for discrete random variable and its applications. Statistics. 2012;46:767–775. doi: 10.1080/02331888.2011.555548
  • Afendras G, Papadatos N, Papathanasiou V. The discrete Mohr and Noll inequality with applications to variance bounds. Sankhyā. 2007;69:162–189.
  • Ord JK. The discrete Student's t distribution. Ann Math Statist. 1968;39:1513–1516. doi: 10.1214/aoms/1177698133
  • Cacoullos T, Papathanasiou V. Characterizations of distributions by variance bounds. Statist Probab Lett. 1989;7:351–356. doi: 10.1016/0167-7152(89)90050-3
  • Hildebrandt EH. Systems of polynomials connected with the Charlier expansions and the Pearson differential and difference equations. Ann Math Statist. 1931;2:379–439. doi: 10.1214/aoms/1177732950
  • Akhiezer NI. The classical moment problem and some related questions in analysis. New York: Hafner Publishing Co; 1965.
  • Riesz M. Sur le problème des moments et le théorème de Parseval correspondant (in French). Acta Litt Ac Sci (Szeged). 1923;1:209–225.
  • Berg C, Christensen JPR. Density questions in the classical theory of moments (Grenoble). Ann Inst Fourier. 1981;31:99–114. doi: 10.5802/aif.840
  • Afendras G, Papadatos N. Strengthened Chernoff-type variance bounds. Bernoulli. 2014;20:245–264. doi: 10.3150/12-BEJ484
  • Afendras G. Unified extension of variance bounds for integrated Pearson family. Ann Inst Statist Math. 2013;65:687–702. doi: 10.1007/s10463-012-0388-3

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