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Communications in Statistics - Theory and Methods Volume 45, 2016 - Issue 18
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Original Articles

Non uniform bound on a combinatorial central limit theorem

W. SimcharoenDepartment of Mathematics and Computer Science, Faculty of Science, Chulalongkorn University, Bangkok, Thailand
&
K. NeammaneeDepartment of Mathematics and Computer Science, Faculty of Science, Chulalongkorn University, Bangkok, ThailandCorrespondence[email protected]
Pages 5517-5532 | Received 09 Feb 2014, Accepted 09 Jul 2014, Published online: 11 Jul 2016

References

  • Bolthausen, E. (1984). An estimate of the remainder in a combinatorial central limit theorem. Probab. Theory Relat. Fields 66(3):379–386.
  • Chaidee, N. (2005). Non-uniform bounds in normal approximation for matrix correlation statistics and independent bounded random variables. Ph.D. Thesis. Chulalongkorn University, Thailand.
  • Chen, L.H.Y., Fang, X. On the error bound in a combinatorial central limit theorem. Bernoulli 21(1):335–359.
  • Chen, L.H.Y., Goldstein, L., Shao, Q.M. (2011). Normal Approximation by Stein’s Method Normal Approximation by Stein’s Method. Springer Series in Probability and Its Applications. New York: Springer-Verlag.
  • Chen, L.H.Y., Shao, Q.M. (2001). A non-uniform Berry-Esseen bound via Stein’s method. Probab. Theor. Relat. Fields 120:236–254.
  • Does, R.J.M.M. (1982). Berry-Esseen theorem for simple linear rank statistics. Ann. Probab. 10:982–991.
  • Fraser, D.A.S. (1957). Nonparametric Methods in Statistics. New York: John Wiley.
  • Goldstein, L. (2005). Berry Esseen bounds for combinatorial central limit theorems and pattern occurrences, using zero and size biasing. J. Appl. Probab. 42:661–683.
  • Goldstein, L., Rinott, Y. (1996). Multivariate normal approximations by Stein’s method and size bias couplings. J. Appl. Probab. 33:1–17.
  • Goldstein, L., Reinert, G. (1997). Stein’s method and the zero bias transformation with application to simple random sampling. Ann. Appl. Probab. 7(4):935–952.
  • Ho, S.T., Chen, L.H.Y. (1978). An Lp bound for the remainder in a combinatorial central limit theorem. Ann. Probab. 6:231–249.
  • Hoeffding, W. (1951). A combinatorial central limit theorem. Ann. Math. Stat. 22:558–566.
  • Neammanee, K., Laipaporn, K. (2007). A non-uniform bound on normal approximation of randomized orthogonal array sampling designs. Int. Math. Forum 48:2347–2367.
  • Neammanee, K., Rattanawong, P. (2008). A uniform bound on the generalization of a combinatorial central limit theorem. Int. Math. Forum 3:11–27.
  • Neammanee, K., Rattanawong, P. (2009). Non-uniform bound on normal approximation of Latin hypercube sampling. JMR 1:28–42.
  • Neammanee, K., Rerkruthairat. (2012). An improvement of a uniform bound on a combinatorial central limit theorem. Commun. Stat.-Theory Methods 41(9):1590–1602.
  • Neammanee, K., Suntornchost, J. (2005). A uniform bound on a combinatorial central limit theorem. Stoch. Anal. Appl. 23:559–578.
  • Puri, M.L., Sen, P.K. (1971). Nonparametric Methods in Multivariate Analysis. New York: John Wiley.
  • Stein, C.M. (1972). A bound for the error in the normal approximation to the distribution of a sum of dependent random variables. In: Proc. Sixth Berkeley Symp. Math. Statist. Probab. (Vol. 2, pp. 583–602). Berkeley: University of California Press.
  • Stein, C.M. (1986). Approximate Computation of Expectation. Hayward, CA: IMS.
  • Von Bahr, B. (1976). Remainder term estimate in a combinatorial central limit theorem. Z. Wahrsch. Verw. Gebiete. 35:131–139.
  • Wald, A., Wolfowitz, J. (1944). Statistical tests on permutations of observations. Ann. Math. Stat. 15:358–372.

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