Optimality

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320 D. Bhattacharya and A. K. Basu Example 3.1. Consider the LINEX loss function as defined by (1.1). It can be seen that l(△) satisfies all the assumptions A1–A7 stated in Section 2. Here a simple calculation will yield h(β, w) = b(e aw− 1 2 (β+ 1 2 and h(β, w) attains its minimum at β0(w) =− 1 2 4. Concluding remarks a w1/2 ) 1 − − aw 2 β− 1), a w1/2 and h(β0, w) =− b a 2 2 w . From the results discussed in Le Cam and Yang [13] and Jeganathan [10] it is clear that under symmetric loss structure the results derived in Theorem 3.1 hold with 1 − 1 2 − respect to the estimator Wn (θ0)Zn(θ0) and its asymptotic counterpart W 2 Z. Here due to the presence of asymmetry in the loss structure the results derived in Theorem 3.1 hold with respect to the estimator Wn (θ0)(Zn(θ0)−β0(W))+β0(W) 1 − and W 2 (Z− β0(W)) + β0(W). − 1 2 1 − Now Wn (θ0)(Zn(θ0)−β0(W))⇒W 2 (Z− β0(W)). Hence the asymptotic 1 − bias of the estimator under asymmetric loss would be E(W 2 (θ0)(Z− β0(W)) + β0(W)−θ) = E(θ + β0(W)−θ) = E(β0(W)). Consider the model described in Example 2.1. Under the LINEX loss we have β0(w) =− a 1 2 w1/2 (vide Example 3.1). Here the asymptotic bias of the estimator would be E(β0(W)) =− a 1 − E(W 2 ), which is finite due to Assumption A8. 2 The results obtained in this paper can be extended in the following two directions: (1) To investigate the case when the experiment is Locally Asymptotically Quadratic (LAQ), and (2) To find the asymptotic minimax lower bound for a sequential estimation scheme under the conditions of LAN, LAMN and LAQ considering asymmetric loss function. Acknowledgments. The authors are indebted to the referees, whose comments and suggestions led to a significant improvement of the paper. The first author is also grateful to the Editor for his support in publishing the article. References [1] Bahadur, R. R. (1960). On the asymptotic efficiency of tests and estimates. Sankhya 22, 229–252. [2] Bahadur, R. R. (1967). Rates of convergence of estimates and test statistics. Ann. Math. Statist. 38, 303–324. [3] Basu, A. K. and Bhattacharya, D. (1999). Asymptotic minimax bounds for sequential estimators of parameters in a locally asymptotically quadratic family, Braz. J. Probab. Statist. 13, 137–148. [4] Basu, D. (1956). The concept of asymptotic efficiency. Sankhyā 17, 193–196. [5] Basawa, I. V. and Scott, D. J. (1983). Asymptotic Optimal Inference for Nonergodic Models. Lecture Notes in Statistics. Springer-Verlag. [6] Bhattacharya, D. and Roussas, G. G. (2001). Exponential approximation for randomly stopped locally asymptotically mixture of normal experiments. Stochastic Modeling and Applications 4, 2, 56–71. [7] Bhattacharya, D., Samaniego, F. J. and Vestrup, E. M. (2002). On the comparative performance of Bayesian and classical point estimators under asymmetric loss. Sankhyā Ser. B 64, 230–266. − 1 2
Local asymptotic minimax risk/asymmetric loss 321 [8] Hájek, J. (1972). Local asymptotic minimax and admissibility in estimation. Proc. Sixth Berkeley Symp. Math. Statist. Probab. Univ. California Press, Berkeley, 175–194. [9] Ibragimov, I. A. and Has’minskii, R. Z. (1981). Statistical Estimation: Asymptotic Theory. Springer-Verlag, New York. [10] Jeganathan, P. (1983). Some asymptotic properties of risk functions when the limit of the experiment is mixed normal. Sankhyā Ser. A 45, 66–87. [11] Le Cam, L. (1953). On some asymptotic properties of maximum likelihood and Bayes’ estimates. Univ. California Publ. Statist. 1, 277–330. [12] Le Cam, L. (1960). Locally asymptotically normal families of distributions. Univ. California Publ. Statist. 3, 37–98. [13] Le Cam, L. and Yang, G. L. (2000). Asymptotics in Statistics, Some Basic Concepts. Lecture Notes in Statistics. Springer, Verlag. [14] Lepskii, O. V. (1987). Asymptotic minimax parameter estimator for non symmetric loss function. Theo. Probab. Appl. 32, 160–164. [15] Levine, R. A. and Bhattacharya, D. (2000). Bayesion estimation and prior selection for AR(1) model using asymmetric loss function. Technical report 353, Department of Statistics, University of California, Davis. [16] Rojo, J. (1987). On the admissibility of cX + d with respect to the LINEX loss function. Commun. Statist. Theory Meth. 16, (12), 3745–3748. [17] Takagi, Y. (1994). Local asymptotic minimax risk bounds for asymmetric loss functions. Ann. Statist. 22, 39–48. [18] Varian, H. R. (1975). A Bayesian approach to real estate assessment; In Studies in Bayesian Econometrics and Statistics, in Honor of Leonard J. Savage (eds. S. E. Feinberg and A. Zellner). North Holland, 195–208. [19] Wald, A. (1939). Contributions to the theory of statistical estimation and testing hypotheses. Ann. Math. Statist. 10, 299–326. [20] Wald, A. (1947). An essentially complete class of admissible decision functions. Ann. Math. Statist. 18, 549–555. [21] Zellner, A. (1986). Bayesian estimation and prediction using asymmetric loss functions. J. Amer. Statist. Assoc. 81, 446–451.
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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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together with the probabilistic ass
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Statistical models: problem of spec
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Modeling inequality, spread in mult
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Semiparametric transformation model
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6.3. Part (ii) Put (6.1) (6.2) ˙Γ
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Bayesian transformation hazard mode
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Cumulative Hazard 0.0 0.2 0.4 0.6 0
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Hazard function 0.0 0.5 1.0 1.5 2.0
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Copulas, information, dependence an
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Regression trees 211 right model in
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Abs(effects) 0.00 0.05 0.10 0.15 0.
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Regression trees 215 of the tree. T
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Regression trees 217 GUIDE methods
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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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2.1. Maximin efficiency robust test
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1 . . . 1 i . . . . . . R j . . . O
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