Optimality

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168 D. M. Dabrowska We have|x(t)| ≤ max{�y�∞,�y −�∞} exp � t 0 d�b�v and� exp[− � · d�b�v]|x|�∞ ≤ max{�y�∞,�y −�∞}. If yθ(t), and bθ(t) = � t 0 kθ(u)n(du) are functions dependent on a Euclidean parameter θ∈Θ⊂R d , and|kθ|(t)≤k(t), then these bounds hold pointwise in θ and sup{exp[− t≤τ θ∈Θ � t Acknowledgement 0 k(u)n(du)]|xθ(t)|}≤max{sup u≤τ θ∈Θ |yθ|(u), sup|yθ(u−)|}. u≤τ θ∈Θ The paper was presented at the First Erich Leh–mann Symposium, Guanajuato, May 2002. I thank Victor Perez Abreu and Javier Rojo for motivating me to write it. I also thank Kjell Doksum, Misha Nikulin and Chris Klaassen for some discussions. The paper benefited also from comments of an anonymous reviewer and the Editor Javier Rojo. References [1] Arcones, M. A. and Giné, E. (1995). On the law of iterated logarithm for canonical U-statistics and processes. Stochastic Processes Appl. 58, 217–245. [2] Bennett. S. (1983). Analysis of the survival data by the proportional odds model. Statistics in Medicine 2, 273–277. [3] Beesack, P. R. (1975). Gronwall Inequalities. Carlton Math. Lecture Notes 11, Carlton University, Ottawa. [4] Bickel, P. J. (1986) Efficient testing in a class of transformation models. In Proceedings of the 45th Session of the International Statistical Institute. ISI, Amsterdam, 23.3-63–23.3-81. [5] Bickel, P. J. and Ritov, Y. (1995). Local asymptotic normality of ranks and covariates in transformation models. In Festschrift for L. LeCam (D. Pollard and G. Yang, eds). Springer. [6] Bickel, P., Klaassen, C., Ritov, Y. and Wellner, J. A. (1998). Efficient and Adaptive Estimation for Semiparametric Models. Johns Hopkins Univ. Press. [7] Bilias, Y., Gu, M. and Ying, Z. (1997). Towards a general asymptotic theory for Cox model with staggered entry. Ann. Statist. 25, 662–683. [8] Billingsley, P. (1968). Convergence of Probability Measures. Wiley. [9] Bogdanovicius, V. and Nikulin, M. (1999). Generalized proportional hazardss model based on modified partial likelihood. Lifetime Data Analysis 5, 329–350. [10] Bogdanovicius, M. Hafdi, M. A. and Nikulin, M. (2004). Analysis of survival data with cross-effects of survival functions. Biostatistics 5, 415–425. [11] Cheng, S. C., Wei, L. J. and Ying, Z. (1995). Analysis of transformation models with censored data. J. Amer. Statist. Assoc. 92, 227–235. [12] Cox, D. R. (1972). Regression models in life tables. J. Roy. Statist. Soc. Ser. B. 34, 187–202. [13] Cuzick, J. (1988) Rank regression. Ann. Statist. 16, 1369–1389. [14] Dabrowska, D. M. and Doksum, K.A. (1988). Partial likelihood in transformation models. Scand. J. Statist. 15, 1–23.
Semiparametric transformation models 169 [15] Dabrowska, D. M., Doksum, K. A. and Miura, R. (1989). Rank estimates in a class of semiparametric two–sample models. Ann. Inst. Statist. Math. 41, 63–79. [16] Dabrowska, D. M. (2005). Quantile regression in transformation models. Sankhyā 67, 153–187. [17] Dabrowska, D. M. (2006). Information bounds and efficient estimation in a class of transformation models. Manuscript in preparation. [18] Gill, R. D. and Johansen, S. (1990). A survey of product integration with a view toward application in survival analysis. Ann. Statist. 18, 1501–1555. [19] Giné, E. and Guillou, A. (1999). Laws of iterated logarithm for censored data. Ann. Probab. 27, 2042–2067. [20] Gripenberg, G., Londen, S. O. and Staffans, O. (1990). Volterra Integral and Functional Equations. Cambridge University Press. [21] Klaassen, C. A. J. (1993). Efficient estimation in the Clayton–Cuzick model for survival data. Tech. Report, University of Amsterdam, Amsterdam, Holland. [22] Kosorok, M. R. , Lee, B. L. and Fine, J. P. (2004). Robust inference for univariate proportional hazardss frailty regression models. Ann. Statist. 32, 1448–1449. [23] Lehmann, E. L. (1953). The power of rank tests. Ann. Math. Statist. 24, 23–43. [24] Maurin, K. (1976). Analysis. Polish Scientific Publishers and D. Reidel Pub. Co, Dodrecht, Holland. [25] Mikhlin, S. G. (1960). Linear Integral Equations. Hindustan Publ. Corp., Delhi. [26] Murphy, S. A. (1994). Consistency in a proportional hazardss model incorporating a random effect. Ann. Statist. 25, 1014–1035. [27] Murphy, S. A., Rossini, A. J. and van der Vaart, A. W. (1997). Maximum likelihood estimation in the proportional odds model. J. Amer. Statist. Assoc. 92, 968–976. [28] Nielsen, G. G., Gill, R. D., Andersen, P. K. and Sorensen, T. I. A. (1992). A counting process approach to maximum likelihood estimation in frailty models. Scand. J. Statist. 19, 25–44. [29] Pakes, A. and Pollard, D. (1989). Simulation and the asymptotics of the optimization estimators. Econometrica 57, 1027–1057. [30] Parner, E. (1998). Asymptotic theory for the correlated gamma model. Ann. Statist. 26, 183–214. [31] Scharfstein, D. O., Tsiatis, A. A. and Gilbert, P. B. (1998). Semiparametric efficient estimation in the generalized odds-rate class of regression models for right-censored time to event data. Lifetime and Data Analysis 4, 355–393. [32] Serfling, R. (1981). Approximation Theorems of Mathematical Statistics. Wiley. [33] Slud, E. and Vonta, F. (2004). Consistency of the NMPL estimator in the right censored transformation model. Scand. J. Statist. 31 , 21–43. [34] Yang, S. and Prentice, R. (1999). Semiparametric inference in the proportional odds regression model. J. Amer. Statist. Assoc. 94, 125–136.
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Institute of Mathematical Statistic
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Institute of Mathematical Statistic
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iv Contents Copulas and Decoupling
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vi Finally, thanks go the Statistic
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SCIENTIFIC PROGRAM The Second Erich
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x Recent Advances in Longitudinal D
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The Second Lehmann Symposium—Opti
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xiv Richard Davis Colorado State Un
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xvi Matthias Matheas Rice Universit
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xviii Hui Zhao University of Texas
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IMS Lecture Notes-Monograph Series
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Proof. The maximum LR test rejects
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4. Location-scale families On likel
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6. Conclusions On likelihood ratio
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Student’s t-test for scale mixtur
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Optimality in multiple testing 17 w
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Optimality in multiple testing 19 I
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power 0.02 0.03 0.04 0.05 0.06 0.07
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Optimality in multiple testing 23 i
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Optimality in multiple testing 25 (
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Optimality in multiple testing 27 M
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6. Summary Optimality in multiple t
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Optimality in multiple testing 31 [
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On the false discovery proportion 3
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≤ N� � N� P m=1 On the fals
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Since j≤ s, it follows that On th
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0.025 0.02 0.015 0.01 0.005 On the
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Massive multiple hypotheses testing
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P value EDF qdf 0.0 0.2 0.4 0.6 0.8
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Proof. See Appendix. Massive multip
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X1 Massive multiple hypotheses test
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0.0 0.2 0.4 0.6 0.8 1.0 0.0 0.2 0.4
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Then π0α ∗ cal π0α ∗ cal +
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Frequentist statistics: theory of i
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2.3. Failure and confirmation Frequ
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3.1. Types of null hypothesis Frequ
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together with the probabilistic ass
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Statistical models: problem of spec
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Page 153 and 154: Semiparametric transformation model
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Page 205 and 206: Copulas, information, dependence an
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Page 235 and 236: Regression trees 215 of the tree. T
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Regression trees 219 and E appear a
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Regression trees 221 Table 3 Result
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Solder =thick 2.5 Regression trees
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Observed values 0 10 20 30 40 50 60
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Regression trees 227 effects and in
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On Competing risk and degradation p
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Restricted estimation in competing
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9. Conclusion 0.0 0.1 0.2 0.3 0.4 0
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2.1. Maximin efficiency robust test
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Robust tests for genetic associatio
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1 . . . 1 i . . . . . . R j . . . O
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Optimal sampling strategies 269 as
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Optimal sampling strategies 271 γ1
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Optimal sampling strategies 273 Def
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Optimal sampling strategies 275 Usi
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Optimal sampling strategies 277 Def
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optimal 1 2 3 4 leaf sets 5 6 (leaf
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6. Related work Optimal sampling st
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Optimal sampling strategies 283 Cla
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Optimal sampling strategies 285 Sin
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Optimal sampling strategies 287 µ
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Optimal sampling strategies 289 on
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Linear prediction after model selec
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y the P× 1 vector (3.1) ηn(p) = L
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Appendix B: Proofs for Section 5 Li
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Local asymptotic minimax risk/asymm
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Then (3.5) Local asymptotic minimax
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Moment-density estimation 323 may n
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3. The bias and MSE of ˆf ∗ α M
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Moment-density estimation 327 Corol
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Moment-density estimation 329 Suppo
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6. Simulations Moment-density estim
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Moment-density estimation 333 [7] M
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for positive α, and for α = 0 as
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Asymptotics of the MDPDE 337 Lemma
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Asymptotics of the MDPDE 339 asympt
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