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Journal of Statistical Computation and Simulation Volume 84, 2014 - Issue 3
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Original Articles

Computation of multivariate normal probabilities with polar coordinate systems

Noboru NomuraNational Institute of Advanced Industrial Science and Technology (AIST), Tsukuba, Ibaraki305-8569, JapanCorrespondence[email protected]
Pages 491-512 | Received 30 Nov 2011, Accepted 28 Jul 2012, Published online: 06 Sep 2012

References

  • M. Kendall, Proof of relations connected with the tetrachoric series and its generalization, Biometrika 32 (1941), pp. 196–198.
  • B. Harris and A. Soms, The use of the tetrachoric series for evaluating multivariate normal probabilities, J. Multivariate Anal. 10 (1980), pp. 252–267. doi: 10.1016/0047-259X(80)90017-2
  • Y. Tong, The Multivariate Normal Distribution, Springer-Verlag, New York, 1990.
  • H. Gassmann, I. Deak, and T. Szantai, Computing multivariate normal probabilities: A new look, J. Comput. Graph. Stat. 11 (2002), pp. 920–949.
  • A. Genz and F. Bretz, Computation of Multivariate Normal and t Probabilities, Springer-Verlag, Berlin-Heidelberg, 2009.
  • A. Hayter, Recursive integration methodologies with statistical applications, J. Stat. Plan. Infer. 136 (2006), pp. 2284–2296. doi: 10.1016/j.jspi.2005.08.024
  • T. Miwa, A. Hayter, and W. Liu, Calculations of level probabilities for normal random variables with unequal variances with applications to Bartholomew's test in unbalanced one-way models, Comput. Stat. Data Anal. 34 (2000), pp. 17–32. doi: 10.1016/S0167-9473(99)00075-4
  • T. Miwa, A. Hayter, and S. Kuriki, The evaluation of general non-centred orthant probabilities, J. R. Statist. Soc. B 65 (2003), pp. 223–234. doi: 10.1111/1467-9868.00382
  • P. Craig, A new reconstruction of multivariate normal orthant probabilities, J. R. Statist. Soc. B 70 (2008), pp. 227–243.
  • A. Genz, Numerical computation of multivariate normal probabilities, J. Comput. Graph. Stat. 1 (1992), pp. 141–150.
  • K. Ito (ed.), Encyclopedic Dictionary of Mathematics, 2nd ed., MIT Press, Cambridge, MA, 1987.

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