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Results: 35
Number of items: 35
  • van Es, A. J., Klaassen, C. A. J., & Oudshoorn, C. G. M. (2000). Survival analysis under cross sectional sampling: length bias and multiplicative censoring. Journal of Statistical Planning and Inference, 91, 295-312. https://doi.org/10.1016/S0378-3758(00)00183-X
  • Klaassen, C. A. J., Mokveld, P. J., & van Es, A. J. (2000). Squared skewness minus kurtosis bounded by 186/125 for unimodal distributions. Statistics & Probability Letters, 50, 131-135. https://doi.org/10.1016/S0167-7152(00)00090-0
  • van Es, A. J., Helmers, R., & Huskova, M. (2000). On a crossroad of resampling plans: bootstrapping elementary symmetric polynomials. Statistica Neerlandica, 54, 100-110.
  • Open Access
    van Es, B. (2000). On the expansion of the mean integrated squared error of a kernel density estimator. s.n.
  • van Es, A. J., & Kok, A. R. (1998). Simple kernel estimators for certain nonparametric deconvolution problems. Statistics & Probability Letters, 39, 151-160. https://doi.org/10.1016/S0167-7152(98)00054-6
  • van Es, A. J., Jongbloed, G., & van Zuijlen, M. (1998). Isotonic inverse estimators for nonparametric deconvolution. The Annals of Statistics, 26, 2395-2406.
  • van Es, A. J. (1998). A local minimax lower bound for nonparametric deconvolution. In P. Lachout, M. Huvskova, & J. A. Visek (Eds.), Prague Stochastics '98 (pp. 563-568). (Union of Czech Mathematicians and Physicists 1998). Union of Czech Mathematicians and Physicists.
  • van Es, A. J. (1997). A note on the integrated squared error of a kernel density estimator in non-smooth cases. Statistics & Probability Letters, 35, 241-250. https://doi.org/10.1016/S0167-7152(97)00019-9
  • van Es, A. J., & Hoogstrate, A. J. (1997). How much do plug-in bandwidth selectors adapt to non-smoothness? Journal of Nonparametric Statistics, 8, 185-197.
  • van Es, A. J., Helmers, R., & Huskova, M. (1997). On a crossroads of resampling plans: bootstrapping elementary symmetric polynomials. (CWI Report; No. PNA-R9704). CWI.
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