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Design and Statistical Analysis of Thorough QT (TQT) Studies

Design and Statistical Analysis of Thorough QT (TQT) Studies. Yi Tsong, Ph.D., CDER/FDA Co-author – Joanne Zhang, Ph.D., CDER/FDA The opinions presented by here do not necessarily represent those of the U.S. Food and Drug Administration. Acknowledgement.

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Design and Statistical Analysis of Thorough QT (TQT) Studies

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  1. Design and Statistical Analysis of Thorough QT (TQT) Studies Yi Tsong, Ph.D., CDER/FDA Co-author – Joanne Zhang, Ph.D., CDER/FDA The opinions presented by here do not necessarily represent those of the U.S. Food and Drug Administration.

  2. Acknowledgement • TQT Study Statistical Review Coordinator • Joanne Zhang, Ph.D., Div. of Biostatistics VI, CDER • TQT Statistical Method Support Team Team Leader: Stella Machado, Ph.D., Director, Div. of Biometrics VI • James Hung, Ph.D., Director, Div. of Biometrics I • Robert O’Neill, Ph.D., Director, Office of Biostat. • Meiyu Shen, Ph.D., Stat. Reviewer, DBVI • Yi Tsong, Ph.D., Deputy Director, DBVI • Joanne Zhang, Ph.D., Stat. Reviewer, DBVI • Other Supporting Statisticians • Ling Chen, Ph.D., Stat. Reviewer, DBVI • Jinglin Zhong, Ph.D., Stat. Reviewer, DBVI Biostatistics Seminar at Columbia University October 11, 2007

  3. Outline • Background • Objective of TQT Study • Design Considerations • Primary Analysis - ICH E14 approach - Concentration – response modeling approach - Validation test (Assay Sensitivity) V. Other Issues - Sample size planning - Missing data - Adaptive designs Biostatistics Seminar at Columbia University October 11, 2007

  4. I. BACKGROUND Biostatistics Seminar at Columbia University October 11, 2007

  5. Biostatistics Seminar at Columbia University October 11, 2007

  6. Biostatistics Seminar at Columbia University October 11, 2007

  7. Biostatistics Seminar at Columbia University October 11, 2007

  8. Biostatistics Seminar at Columbia University October 11, 2007

  9. Biostatistics Seminar at Columbia University October 11, 2007

  10. (Fridericia’s) Biostatistics Seminar at Columbia University October 11, 2007

  11. Biostatistics Seminar at Columbia University October 11, 2007

  12. II. Objective of TQT Study Biostatistics Seminar at Columbia University October 11, 2007

  13. Current ICH E 14 Guidance requests all sponsors submitting new drug applications to conduct a thorough QT/QTc study • Generally conducted in early clinical development after some knowledge of the pharmacokinetics of the drug • Goal: to demonstrate the lack of QT prolongation effect due to the drug Biostatistics Seminar at Columbia University October 11, 2007

  14. Negative TQT Study • ICH E14 Guidance “A negative ‘thorough QT/QTc study’ is one in which the upper bound of the 95% one-sided confidence interval for the largest time-matched mean effect of the drug on the QTc interval excludes 10 ms. This definition is chosen to provide reasonable assurance that the mean effect of the study drug on the QT/QTc interval is not greater than around 5msec, which is the threshold level of regulatory concern” “Positive” otherwise Biostatistics Seminar at Columbia University October 11, 2007

  15. Typical treatments to be included in a TQT trial1. Placebo, P2. Positive control treatment, PC3. Test drug with therapeutic dose, DT4. Test drug with supratherapeutic dose, DSObjectives of the TQT trial 1. To show that DT – P < C and DS – P < C with C = 10 msec (a specific value at every selected time point) 2. To show that the trial is valid by showing that PC – P > C* a specific value at some selected time points (e.g. 5 msec) Biostatistics Seminar at Columbia University October 11, 2007

  16. Primary Endpoint • The primary endpoint should be the time-matched mean difference between the drug and placebo after baseline adjustment at each time point. • For a crossover study (N subjects) DQTc(t, i) – baseline adjusted QTc for subject i, at time t for the drug, PC, DT and DS PQTc(t, i) – baseline adjusted QTc for subject i, at time t for placebo  D-PQTc(t, i) = DQTc(t, i) - PQTc(t, i) Primary endpoint:  D-PQTc(t) = i=1N D-PQTc(t, i)/N • For a parallel study (N1 subjects in the drug group and N2 in placebo) DQTc(t, i) – baseline adjusted QTc for subject i, at time t for the drug PQTc(t, j) – baseline adjusted QTc for subject j, at time t for placebo DQTc(t) =  DQTc(t, i)/N1, PQTc(t) =  PQTc(t, j)/N2, Primary endpoint:  D-PQTc(t) = DQTc(t) - PQTc(t) Biostatistics Seminar at Columbia University October 11, 2007

  17. III. Design Considerations Biostatistics Seminar at Columbia University October 11, 2007

  18. Design Issues • Randomized, double blinded, placebo and active controlled, crossover or parallel study with single or multiple doses of the drugs. • Normally healthy volunteers (except when there are some safety or tolerability concerns of the drug, e.g., oncology drug products). • The QT intervals (or ECG measurements) are normally collected at multiple time points (for example, 0, 0.5, 1, 2, 3, 3.5, 4, 4.5, 6, 9, 12, 24h after dosing). • Baseline values are required. • For a parallel study, Day -1 time-matched baseline • For a crossover study, a pre-dose baseline at each period • Three replicates at each time point Biostatistics Seminar at Columbia University October 11, 2007

  19. Parallel Design Parallel group studies are recommended for drugs: • Long elimination half-lives • Where carryover effects may be of concern • Drug regimens with multiple doses Disadvantages of a parallel trial in comparison to a crossover design • Larger variability • Much larger sample size Biostatistics Seminar at Columbia University October 11, 2007

  20. Crossover Design • Subjects will be randomly assigned to receive one of a set of sequences of treatments under study. Each sequence represents a pre-specified ordering of the treatments with sufficiently washout (approximately 5 times of the maximum half life of the test and positive control treatments) between two treatments. • For example, for four treatments, the four sequences can be Sequence #1: DT/DS/P/PC; Sequence #2: DS/PC/DT/P; Sequence #3: P/DT/PC/DS; Sequence #4: PC/P/DS/DT; Biostatistics Seminar at Columbia University October 11, 2007

  21. Often Used Crossover Designs - Assuming 4 treatments and 48 subjects • Williams Square • Features: • Balance can be achieved with one square • Variance balanced • For even number of treatments, a square can be used, the # of sequences = the # of treatment arms • For odd number of treatments, two squares must be used. The number of sequences equals 2 times of treatments. Biostatistics Seminar at Columbia University October 11, 2007

  22. The advantage of variance balanced design Variance between estimated direct treatment effects is the same for any two treatments. So, each treatment will be equally precisely compared with every other treatment [Jones and Kenward, 2003]. However, if the study model includes period, sequence, treatment, first-order carryover and direct-by-carryover interaction as fixed effects, the design based on one Williams square does not have sufficient degrees of freedom to assess direct-by-carryover interaction [Chen and Tsong, DIJ 2007]. It can be improved with multiple Latin squares. Randomize by square or by sequence?

  23. Repeated Multiple Latin Squares DT DS P PC DT P PC DS DS DT PC P DS PC P DT P PC DT DS P DT DS PC PC P DS DT PC DS DT P A Latin square is less restrictive than a Williams square in that it requires only that all four treatments appears in each row and in each complete exactly once. Use balanced (the number of A before B equals the number of B before A) Latin squares. When there is no concern of carryover effect, Latin square is the most efficient crossover design. In order to improve the degrees of freedom in assessing direct-by-carryover interaction, multiple distinct Latin square may be used. It is a common practice to randomize the subjects into the distinct sequences of the Latin squares. With 48 subjects, we will have 6 replicates of the Latin sqaure pairs.

  24. Note that the two Latin squares presented here are orthogonal (i.e., when they are superimposed, each letter of one square occurs exactly once with every letter of the other Latin square). • Note also that with this design, there is only one subject who receives DS right before P once but there are three subjects who receive P right before PC. It leads to the unbalance of carryover effect in the analysis. • A better design used by some sponsors is a completely orthogonal set of Latin squares as described below. Biostatistics Seminar at Columbia University October 11, 2007

  25. For the assessment of treatment effect using a Williams square or a set of Latin squares, the investigator and regulator may adjust the estimate of treatment effect for the carryover effect from the period immediately preceding. It is assumed that no carryover effect persists from the treatment two periods back. • A completely orthogonal set of I – 1 Latin square supplies the design to balance the carryover effect of the treatment in periods both follow immediately and two periods back. One of the complete orthogonal set of Latin squares of the four treatments is listed below [Jones and Kenward, 2003][Chen and Tsong, DIJ 2007]. Biostatistics Seminar at Columbia University October 11, 2007

  26. Complete set of Orthogonal Latin Squares DT DS P PC DT P PC DS DT PC DS P DS DT PC P DS PC P DT DS P DT PC P PC DT DS P DT DS PC P DS PC DT PC P DS DT PC DS DT P PC DT P DS • Two step randomization : • Randomize 48 subjects to one of 4 Latin square triplets • Randomize 12 subjects to the 12 sequences of the Latin square triplets Note that with a complete set of orthogonal Latin squares, the number of times treatment A follows treatment B immediately equals the number of times treatments C follows treatment D immediately. Biostatistics Seminar at Columbia University October 11, 2007

  27. Although this design consists also of twelve Latin squares, because these squares consist twelve distinct sequences, there are 48 degrees of freedom available to assess fixed effects using Model (2). The advantages of using this design are: It is a variance-balanced design. There are enough degrees of freedom to assess direct-by-carryover interaction. Treatment effect can be adjusted for 1st order and 2nd order direct-by-carryover interaction. • However, more squares means the whole design is more destructible. Biostatistics Seminar at Columbia University October 11, 2007

  28. Concerns of Crossover Design • Note that in TQT studies, depending on the length of the washout period required, drop-out rate of subjects varies. Conventionally, the investigator either replaces the sequence of the drop-out subject by a new subject in order to maintain the design form or the study is analyzed with the data of the completers. In the latter case, a Williams square or Latin square design with missing data is often analyzed as a complete randomized crossover trial. Biostatistics Seminar at Columbia University October 11, 2007

  29. Primary Analysis Biostatistics Seminar at Columbia University October 11, 2007

  30. ICH E14 recommended methodThorough QT (TQT) Study and goals: statistical considerations • A ‘thorough QT/QTc Study’ of a drug is a single clinical trial, conducted early in development, dedicated to evaluating the effect of the drug on cardiac repolarization, as detected by QT/QTc prolongation. • Overall goal: to determine whether the TQT study is negative or not Biostatistics Seminar at Columbia University October 11, 2007 Source: Statistical Aspects of ICH E14 by Stella G. Machado

  31. “A negative thorough QT/QTc study is one in which the upper bound of the 95% one-sided confidence interval for the largest time-matched mean effect* of the drug on the QTc interval is  10ms.This definition is chosen to provide reasonable assurance that the mean effect of the study drug on the QT/QTc interval is not greater than around 5ms, which is the threshold level of regulatory concern” * time-matched mean effect at each time point after dosing is the difference in the QT/QTc interval between the drug and placebo (baseline adjusted) AT EACH MATCHED TIMEPOINT. Source: Statistical Aspects of ICH E14 by Stella G. Machado

  32. Statistical Hypotheses H0: t(D) - t(P) ≥ 10 ms for at least one t i.e. (t=1k {t(D) - t(P)} ≥10) • H1: t(D) - t(P) < 10 ms for all t i.e. (t=1k{t(D) - t(P)} < 10) t(D) and t(P) are the population means for the drug and placebo at time t, t=1,2,…,k. k is the total number of selected time points where QT has been measured. • Claim a negative QT/QTc study if H0 is rejected • Use  = 0.05 Note: Rejecting H0 does not reject H0: t(D) - t(P) ≥ 5 for all t = 1, …, k. In order to distinct the drug from PC, it needs to show that the lower 90% confidence limits are < 5 for all t = 1, …, k Biostatistics Seminar at Columbia University October 11, 2007

  33. MEASUREMENTS OF QTc - Continued • Adequate ECG sampling around tmax and afterwards of active drugs. • Appropriate to consider at least 3 replicate ECG’s at each time point → to improve precision • How many time points? • More time points give better profile of QTc(t) • Do we care about QTc(t) at t << tmax ? Bad assay or bad reading ? • Or for t >> tmax ? Possible lag effect? Poor estimation of tmax ? Can it be Max (QTc(t))? Biostatistics Seminar at Columbia University October 11, 2007

  34. Intersection-Union Test • The type I error or false negative rate, , is maintained at 5%.  = P(claim a negative TQT | the drug is a QT prolonger) No need for multiplicity adjustment to test for a negative TQT study • The type II error or false positive rate, , is a function of several variables including variability of the study, sample size, number of time points, and the true mean difference to be detected  = P(claim a positive study | the drug is not a QT prolonger) Biostatistics Seminar at Columbia University October 11, 2007

  35. The E14 Max (Mean change) Approach Most statisticians interpret E14 proposed approach as testing H0: Max t (∆∆QTc(t))  10 vs Ha: Max t (∆∆QTc(t)) < 10, t = 0, t1, t2, …, tK = T (1) Hypothesis (1) can be restated as, H0: (∆∆QTc(tk))  10 vs Ha: (∆∆QTc(tk)) < 10, tk = 0, t1, t2, …, tK = T (1’) Can also be restated as, H0: k{∆∆QTc(tk)  10} vs Ha: k{∆∆QTc(tk) < 10} (1”) Biostatistics Seminar at Columbia University October 11, 2007

  36. Power issue of IU test • IU test controls type I error rate regardless how large is K • Power↓ if δt (= ∆∆QTc(t))↑ but < 10. • For XO trial, σ = 8, δt = 5 for all t, α= 0.05, n = 69 gives power = 90% for 5 time points, assume ρk’k = 0 (Zhang and Machado, 2006 unpublished) • Power increases with when ρk’k≠ 0, ρk’k is the correlation between ∆∆QTc(tk’) and ∆∆QTc(tk). • Power decreases when K increases (→Larger false positive rate with better change profile?) Biostatistics Seminar at Columbia University October 11, 2007

  37. Concentration-response modeling approach • Assume linear relationship of QTc and the plasma concen. or log (plasma concen.), ∆∆QTci(t) = αi +iC (t) • Maxt∆∆QTci(t) = αi +iCmax(i) • Linear mixed effects modeling is used to estimate the population slope  and standard error of the slope (SE(β)) • Estimate the mean maximum plasma concentration • The exposure-response (ER) statistic and the upper one-sided 95% confidence limit is computed from the mean maximum plasma concentration , i.e. ∆∆QTc estimated by , is population slope determined by linear mixed effect model. • The ER statistic and upper one-sided 95% confidence limit can be computed from the estimated mean maximum plasma concentration, for each dose using the following equations: • Upper one-sided 95% CI: = * ( + 1.65*SE()). Biostatistics Seminar at Columbia University October 11, 2007

  38. If the objective of concentration-response model approach is to test • H0: E[Maxt∆∆QTci(t)] ≥ 10 • Or H0:E[∆∆QTci(tmax)] ≥ 10 Or should we use a c** different from 10 msec? • If the model assumption is really valid, we will have • E[Maxt∆∆QTci(t)] ≥ ∆∆QTc ≥ Max k (∆∆QTc(tk)) • In practice, using C-R model with invalid linear assumption or biased estimation → estimate of E[Maxt∆∆QTci(t)] < Max k (∆∆QTc(tk)) Biostatistics Seminar at Columbia University October 11, 2007

  39. Statistical issues of linear concentration-QTc change modeling(Tsong, Y., et al,. To appear in JBS, 2008) • Data used in illustration • Data of concentration and QT change (adjusted for baseline and placebo) of subjects treated by Moxi (positive control) of five NDAs • Data of concentration and QT change (adjusted for baseline and placebo) of subjects treated by test drugs of three NDAs Biostatistics Seminar at Columbia University October 11, 2007

  40. Group Plot • For a closer look at the linear fit, we generated a set of exposure-response plots of the first 10 subjects of Moxi subjects. The plot given below indicates that “positive linearity” could indeed be a problem. In the exposure-response plot below of the first ten subjects in moxi2 data file, it is clear that the linearity assumption is questionable for subject #1003, #1001, #1006, #1015, #1017, #1022, #1024 and #1027 • If “positive linearity” assumption is not correct, then the estimate can be seriously biased towards zero and consequently use of this estimate can bias inference in favor of falsely concluding of “no QT effect”. This requires extensive investigation by IRT. Biostatistics Seminar at Columbia University October 11, 2007

  41. Linearity problem with#1001, #1003, #1015, #1017, #1022 #1024 and #1027 Biostatistics Seminar at Columbia University October 11, 2007

  42. Figure 1.A Moxi data 1 – ddQTc, Conc and slope(t) against time Biostatistics Seminar at Columbia University October 11, 2007

  43. Figure 1.D Moxi Data 1 – Predicted ddQTc at Cmax Two ddQT for each Conc → ddQTc can’t be expressed as a function of Conc without time variable Biostatistics Seminar at Columbia University October 11, 2007

  44. Estimation of max(ddQTc) • In Figure 1.A Assuming intercept is known, β(t) = ddQT(t)/Conc(t) – α/Conc(t) Instead to be constant, it varies over time Model predict E(Maxt∆∆QTc(t)) < Max tk (∆∆QTc(tk)) of E14 • In Figures 1.B (ddQTc against Conc without time) • Curve of ddQTc differs before and after reaching maximum → not linear, not even a function of concentration • In Figure 1.B Model predict E(Maxt∆∆QTc(t)) < Max tk (∆∆QTc(tk)) of E14 Biostatistics Seminar at Columbia University October 11, 2007

  45. Figure 2.A Moxi data 2 – ddQTc, Conc and slope(t) against time Biostatistics Seminar at Columbia University October 11, 2007

  46. Figure 2.D Moxi Data 2 – Predicted ddQTc at Cmax Two ddQT for each Conc → ddQTc can’t be expressed as a function of Conc without time variable Biostatistics Seminar at Columbia University October 11, 2007

  47. Figure 3.A Moxi data 3 – ddQTc, Conc and slope(t) against time Biostatistics Seminar at Columbia University October 11, 2007

  48. Figure 3.D Moxi Data 3 – Predicted ddQTc at Cmax Two ddQT for each Conc → ddQTc can’t be expressed as a function of Conc without time variable Biostatistics Seminar at Columbia University October 11, 2007

  49. Figure 4.A Moxi data 4 – ddQTc, Conc and slope(t) against time Biostatistics Seminar at Columbia University October 11, 2007

  50. Figure 4.D Moxi Data 4 – Predicted ddQTc at Cmax Biostatistics Seminar at Columbia University October 11, 2007

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