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Communications in Statistics - Theory and Methods Volume 49, 2020 - Issue 7
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Original Articles

The echelon Markov and Chebyshev inequalities

Haruhiko OgasawaraOtaru University of Commerce, Otaru, JapanCorrespondence[email protected]
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Pages 1578-1591 | Received 27 Mar 2018, Accepted 23 Sep 2018, Published online: 30 Jan 2020

References

  • Barton, M. A., and F. M. Lord. 1981. An upper asymptote for the three-parameter logistic item-response model. Research Report 81-20). Princeton, NJ: Educational Testing Service.
  • Berge, P. O. 1938. A note on a form of Tchebycheff’s theorem for two variables. Biometrika 29 (3/4):405–6.
  • Bock, R. D., and I. Moustaki. 2007. Item response theory in a general framework. In Handbook of statistics, ed. C. R. Rao and S. Sinharay, Vol. 26. Psychometrics, 469–513. New York: Elsevier.
  • Budny, K. 2014. A generalization of Chebyshev’s inequality for Hilbert-space-valued random elements. Statistics and Probability Letters 88:62–5.
  • Budny, K. 2016. An extension of the multivariate Chebyshev’s inequality to a random vector with a singular covariance matrix. Communications in Statistics – Theory and Methods 45 (17):5220–3.
  • Chen, X. 2007. A new generalization of Chebyshev inequality for random vectors. arXiv 0707:0805v1.
  • Chen, X. 2011. A new generalization of Chebyshev inequality for random vectors. arXiv 0707:0805v2.
  • Cohen, J. E. 2015. Markov’s inequality and Chebyshev’s inequality for tail probabilities: A sharper image. The American Statistician 69 (1):5–7.
  • Ghosh, B. K. 2002. Probability inequalities related to Markov’s theorem. The American Statistician 56 (3):186–90.
  • Hong, L. 2012. A remark on the alternative expectation formula. The American Statistician 66 (4):232–3.
  • Hong, L. 2015. Another remark on the alternative expectation formula. The American Statistician 69 (3):157–9.
  • Lal, D. N. 1955. A note on a form of Tchebysheff’s inequality for two or more variables. Sankhyā 15:317–20.
  • Loperfido, N. 2014. A probability inequality related to Mardia’s kurtosis. In Mathematical and statistical methods for actuarial sciences, eds. C. Perma and M. Sibillo, 129–132. Milan: Springer.
  • Lord, F. M. 1980. Applications of item response theory to practical testing problems. Hillsdale, NJ: Erlbaum.
  • Lord, F. M., and M. R. Novick. 1968. Statistical theories of mental test scores. Reading, MA: Addison-Wesley.
  • Marshall, A. W., and I. Olkin. 1960a. Multivariate Chebyshev inequalities. The Annals of Mathematical Statistics 31 (4):1001–14.
  • Marshall, A. W., and I. Olkin. 1960b. A bivariate Chebyshev inequality for symmetric convex polygons. In Contributions to probability and statistics – essays in honor of harold hotelling, eds. I. Olkin, S. G. Churye, W. Hoeffding, W. G. Madow, and H. B. Mann, 299–308. Stanford, CA: Stanford University Press.
  • Miziuła, P., and J. Navarro. 2017. Sharp bounds for the reliability of systems and mixtures with ordered components. Naval Research Logistics (Nrl) 64 (2):108–16.
  • Miziuła, P., and J. Navarro. 2018. Bounds for the reliability functions of coherent systems with heterogeneous components. Applied Stochastic Models in Business and Industry 34 (2):158–74.
  • Nadarajah, S., and K. Mitov. 2003. Product moments of multivariate random vectors. Communications in Statistics – Theory and Methods 32 (1):47–60.
  • Navarro, J. 2013. A simple proof for the multivariate Chebyshev’s inequality. arXiv 1305:5646v1.
  • Navarro, J. 2014a. Can the bounds in the multivariate Chebyshev’s inequality be attained? Statistics and Probability Letters 91:1–5.
  • Navarro, J. 2014b. A note on confidence regions based on the bivariate Chebyshev inequality. Applications to order statistics and data sets. Istatistik: Journal of the Turkish Statistical Association 7:1–14.
  • Navarro, J. 2016. A very simple proof of the multivariate Chebyshev’s inequality. Communications in Statistics – Theory and Methods 45 (12):3458–63.
  • Ogasawara, H. 2017. Identified and unidentified cases of the three- and four-parameter models in item response theory. Behaviormetrika 44 (2):405–23.
  • Ogasawara, H. 2018. The multivariate Markov and multiple Chebyshev inequalities. Submitted for publication.
  • Olkin, I., and J. W. Pratt. 1958. A multivariate Tchebysheff inequality. The Annals of Mathematical Statistics 29 (1):226–34.
  • Pearson, K. 1919. On generalized Tchebysheff theorems in the mathematical theory of statistics. Biometrika 12 (3–4):284–96.
  • Rohatgi, V. K., and A. K. Md. E. Saleh. 2015. An introduction to probability theory and mathematical statistics. (3rd ed). New York: Wiley.
  • Rychlik, T. 2001. Projecting statistical functionals. New York: Springer.
  • Tong, Y. L. 1980. Probability inequalities in multivariate distributions. New York: Academic Press.

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