Carl SpruillJohn Wiley & Sons, Inc.Spruill, C. (1983), Kiefer-Wolfowitz Equivalence Theorem. In: Kotz, S. et Johnson, N.L., Eds. Encyclopedia of Statistical Sciences, Vol. 4. John Wiley & Sons, Inc. New York.Spruill, C. (1983), Kiefer-Wolfowitz Equivalence Theorem. In: Kotz, S....
An extension of a theorem on the asymptotic dis... MA Johnson 被引量: 0发表: 2010年 Anatomy of a Revolt; What Made a Chorus of Ex-Generals Call for the SecDef's Head? the War over the War-And How Rumsfeld Is Reacting ***CORRECTION: In "Anatomy of a Revolt," we incorrectly report...
Wierich W (1989) An Application of Kiefer-Wolfowitz Equivalence Theorem to ANOVA Models with Additive Regression. J Statist Planning and Inference, Vol 21, pp 277-283Wierich W (1989) An Application of Kiefer-Wolfowitz Equivalence Theorem to ANOVA Models with Additive Regression. J Statist ...
Optimum Design, Kiefer-Wolfowitz Equivalence Theorem fordoi:10.1002/9781118445112.stat00865Carl SpruillJohn Wiley & Sons, Ltd
The main result is a version of the\nKiefer--Wolfowitz theorem comparing the empirical distribution to its least\nconcave majorant, but with a convergence rate $n^{-1}\\log n$ faster than\n$n^{-2/3}\\log n$. The main result is useful in obtaining asymptotic\ndistributions for ...
Optimum Design, Kiefer–Wolfowitz Equivalence Theorem fordoi:10.1002/0471667196.ess1346.pub2This article has no abstract.Carl SpruillJohn Wiley & Sons, Inc.
Optimum Design, Kiefer‐Wolfowitz Equivalence Theorem fordoi:10.1002/9781118445112.stat00865Carl SpruillAmerican Cancer Society