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Estimating the dose response pattern via multiple decision processes. Chihiro HIROTSU Meisei (明星) University. Phase Ⅱ Clinical Trial (Binomial or Normal Model). 1. Proving the monotone dose-response relationship,. with at least one inequality strong. (1).
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Estimating the dose response pattern via multiple decision processes Chihiro HIROTSU Meisei (明星) University
Phase Ⅱ Clinical Trial (Binomial or Normal Model) 1. Proving the monotone dose-response relationship, with at least one inequality strong. (1) 2. Estimating the recommended dose for the ordinary clinical treatments, which shall be confirmed by a Phase Ⅲ trial. The mcp for the interested dose-response patterns should be preferable to fitting a particular parametric model such as logistic distribution.
Table 1. Monotone Dose-Response Patterns of Interest (K=4) ( Non-Sigmoidal )
Maximal Contrast Type Tests max acc. t method (Hirotsu, Kuriki & Hayter, 1992; Hirotsu & Srivastava, 2000) (Changepoint soon after the level k)
Merits of max acc. t method • Immediate correspondence to the complete class lemma for the tests of monotone hypothesis (Hirotsu, Biometrika 1982). • The K-1 components of max acc. t are the projections of the observation vector on to the corner vectors of the convex cone defined by the monotone hypothesis H and every monotone contrast can be expressed by a unique positive liner combination of those basic contrasts (Hirotsu & Marumo, Scand. J. Statist, 2002). • The simultaneous confidence intervals for the basic contrasts of max acc. t can be extended to all the monotone contrasts uniquely whose significance can therefore be evaluated also (Hirotsu & Srivastava, Statistics and Probability Letters, 2000) . • A very efficient and exact algorithm for calculating the distribution function is available based on the Markov property of those components (Hawkins, 1977 ; Worsley,1986 ; Hirotsu, Kuriki & Hayter, Biometrika, 1992). e. High power against wide range of the monotone hypothesis H as compared with other tests such as lrt or William’s (Hirotsu, Kuriki & Hayter, 1992).
Estimating the Dose-Response Patterns 1 (model selection by the maximal contrast) • Apply closed testing procedure based on max acc. t. • Test H0 : μ1= μ2= μ3= μ4 and if it is not significant stop here (0-stopping), otherwise • test H0 : μ1= μ2= μ3 and if it is not significant stop here (1-stopping), otherwise • test H0 : μ1= μ2 and if it is not significant we call it (2-stopping), otherwise we call it 3-stopping.
Estimating the Dose-Response Patterns 1 (continued) • Model selection based on maximal contrast 0-stopping : Accept the null model 1-stopping : Uniquely select Model 1 iff the corresponding contrast is significant. 2-stopping : Select either Model 2 or 4 corresponding to the largest contrast of Models 2 and 4 iff it is significant. 3-stopping: Select either Model 3, 5 or 6 corresponding to the largest contrast of Models 3, 5 and 6 iff it is significant. For evaluating significance of those contrasts that are not included in the basic contrasts of max acc. t an extension to the simultaneous lower bounds by Hirotsu & Srivastava (2000) is applied. Especially this time we need a lemma for evaluating a linear trend.
Simultaneous Lower Bounds by max acc. t Basic contrasts (Each interpreted as estimating under the respective assumed model)
General formula 1 Simultaneous Lower Bounds by max acc. t (continued) Corresponding to the model with changepoint soon after level and saturating at level The basic contrasts correspond to the case
Simultaneous Lower Bounds by max acc. t (continued) General formula 2 Corresponding to the linear regression model : Lemma Estimating the difference under the assumed linear regression model like other monotone contrasts.
Proof of Lemma Deriving SLB for as the best linear combination of the basic contrasts : under the assumption : ( Inhomogeneous and complicated structure ) ( Markov structure )
Proof of Lemma (continue) By Markov structure we have ⇒ and
Proof of Lemma (continue) Final result(simple and explicit form) ・The weights are proportional to the reciprocal of the respective variances. ・This is the formula for independent components with equal expectations. ・The inhomogeneity of expectations and the correlation are nicely cancelling out. This increases the usefulness of max acc t.
Estimating the Dose-Response Patterns 2 (Model selection by the simultaneous lower bounds (SLB)) Comparing SLB(3,3), SLB(2,2), SLB(1,1), SLB(2,3), SLB(1,2) and 3×SLB(linear) for patterns M1, M2, M3, M4, M5 and M6, respectively, will make sense. 1-stopping : Uniquely select M1 iff SLB(3,3)>0. 2-stopping : Select either M2 or M4 corresponding to the largest of SLB(2,2) and SLB(2,3) iff it is above 0. 3-stopping : Select either M3, M5 or M6 corresponding to the largest of SLB(1,1), SLB(1,2) and 3×SLB(linear) iff it is above 0.
Estimating the Dose-Response Patterns 3 (Model selection by SLB due to multiple decision processes) (1) Step-down procedure for and Acceptance sets : ⇒ or ⇒
Confidence sets : with inequality strict if the limit is 0.
Simulation result 1Comparing with other maximal contrasts methods. Table 2. Probability of selecting a model( ) Method ◎: Correct selection; ○: Correct optimal dose HML: by Liu, Miwa & Hayter (2000) Orthogonal :
Simulation result 2Effects of adding monotone contrasts ,,to max acc. t Table 3. Probability of selecting a model ( ) Method : statistic corresponding to : statistic corresponding to : statistic corresponding to Remarkably small effects of adding , and / or
Simulation result 3 Comparing maximal contrast method and SLB method based on max acc. t Table 4. Probability of selecting a model ( ) Method
Simulation result 4 Comparing maximal contrast method and SLB method based on max acc. t Table 5. Probability of selecting a model ( ) Method
Adding Contrasts t4, t5 and/or t6 to the Basic Contrasts (t1, t2,t3) of max acc. t Intending the Detection of Patterns M4, M5 and M6 (Japanese Practice) Method 1 : Method 2 : Method 3 :
Calculating the Critical Point (Normal Theory) easy to evaluate
Concluding Remarks 1. The SLB based on the basic contrasts of max. acc. t can be extended to any monotone contrasts including the linear trend. 2. The effects of adding , and to the basic contrasts of max acc. t are remarkably small. 3. The selection of the monotone contrasts of interest is almost good but the power is not homogeneous for those patterns. The linear trend is difficult to be detected, for example. This is the problem of early stopping due to the step down procedure and the consideration of the overall power is insufficient. 4. The simultaneous confidence internals based on the multiple decision processes behave better for the linear trend.
References 1. Hirotsu,C.(1982). Use of cumulative efficient scores for testing ordered alternatives in discrete models. Biometrika69, 567-577. 2. Hirotsu,C., Kuriki, S. & Hayter,A.J.(1992). Multiple comparison procedures based on the maximal component of the cumulative chisquared statistic. Biometrika79, 381-392. 3. Hirotsu,C. & Srivastava, M. S.(2000). Simultaneous confidence intervals based on one-sided max t test. Statistics & ProbabilityLetters49, 25-37. 4. Hirotsu,C. & Marumo, K.(2002). Changepoint analysis as a method for isotonic inference. Scandinavian J. Statist.29, 125-138. 5. Hothorn,L. A., Vaeth, M., & Hothorn, T.(2003). Trend tests for the evaluation of dose-response relationships in epidemiological exposure studies. Research Reports from the Department of Biostatistics, University of Aarhus. 6. Liu, W., Miwa, T. & Hayter, A. J.(2000). Simultaneous confidence interval estimation for successive comparisons of ordered treatment effects. JSPI 88, 75-86.
