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April 12, 2013 - April 13, 2026

Available Issues

April 12, 2013 - April 13, 2026

Efficient Computation of Overlapping Variance Estimators for Simulation

Published Online:1 Aug 2007https://doi.org/10.1287/ijoc.1060.0198

References

  • Alexopoulos C., Argon N. T., Goldsman D., Tokol G., Ingalls R. G., Rossetti M. D., Smith J. S., Peters B. A. Overlapping variance estimators for simulations. Proc. 2004 Winter Simulation Conf. (2004) Institute of Electrical and Electronics Engineers, Piscataway, NJ:737–745CrossrefGoogle Scholar
  • Alexopoulos C., Argon N. T., Goldsman D., Steiger N. M., Tokol G., Wilson J. R. Overlapping variance estimators for simulation: Software and user’s manual [online]. (2006a) . Technical Report, School of Industrial and Systems Engineering, Georgia Institute of Technology, Atlanta, GA. Accessed April 17, 2006, ftp://ftp.eos.ncsu.edu/pub/eos/pub/jwilson/ovesie-soft.exeGoogle Scholar
  • Alexopoulos C., Argon N. T., Goldsman D., Tokol G., Wilson J. R. Overlapping variance estimators for simulation. Oper. Res. (2006b) . ForthcomingGoogle Scholar
  • Box G. E. P. Some theorems on quadratic forms applied in the study of analysis of variance problems, I. Effect of inequality of variance in the one-way classification. Ann. Math. Statist. (1954) 25:290–302CrossrefGoogle Scholar
  • Foley R. D., Goldsman D. Confidence intervals using orthonormally weighted standardized times series. ACM Trans. Model. Comput. Simulation (1999) 9:297–325CrossrefGoogle Scholar
  • Glynn P. W., Whitt W. Estimating the asymptotic variance with batch means. Oper. Res. Lett. (1991) 10:431–435CrossrefGoogle Scholar
  • Goldsman D., Kang K., Seila A. F. Cramér–von Mises variance estimators for simulations. Oper. Res. (1999) 47:299–309LinkGoogle Scholar
  • Goldsman D., Meketon M., Schruben L. Properties of standardized time series weighted area variance estimators. Management Sci. (1990) 36:602–612LinkGoogle Scholar
  • Hald A.Statistical Theory with Engineering Applications (1952) (John Wiley & Sons, New York) Google Scholar
  • L’Ecuyer P. Good parameters and implementations for combined multiple recursive random number generators. Oper. Res. (1999) 47:159–164LinkGoogle Scholar
  • Meketon M. S., Schmeiser B., Sheppard S., Pooch U., Pegden D. Overlapping batch means: Something for nothing? Proc. 1984 Winter Simulation Conf. (1984) Institute of Electrical and Electronics Engineers, Piscataway, NJ:227–230Google Scholar
  • Sargent R. G., Kang K., Goldsman D. An investigation of finite-sample behavior of confidence interval estimators. Oper. Res. (1992) 40:898–913LinkGoogle Scholar
  • Satterthwaite F. E. Synthesis of variance. Psychometrika (1941) 6:309–316CrossrefGoogle Scholar
  • Schmeiser B. Batch size effects in the analysis of simulation output. Oper. Res. (1982) 30:556–568LinkGoogle Scholar
  • Schruben L. Confidence interval estimation using standardized time series. Oper. Res. (1983) 31:1090–1108LinkGoogle Scholar
  • Song W. T., Schmeiser B. W. Optimal mean-squared-error batch sizes. Management Sci. (1995) 41:110–123LinkGoogle Scholar
  • Steiger N. M., Wilson J. R. Convergence properties of the batch-means method for simulation output analysis. INFORMS J. Comput. (2001) 13:277–293LinkGoogle Scholar
  • Steiger N. M., Lada E. K., Wilson J. R., Joines J. A., Alexopoulos C., Goldsman D. ASAP3: A batch means procedure for steady-state simulation output analysis. ACM Trans. Model. Comput. Simulation (2005) 15:39–73CrossrefGoogle Scholar
  • Welch B. L. On linear combinations of several variances. J. Amer. Statist. Assoc. (1956) 51:132–148CrossrefGoogle Scholar
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