Abstract
Frequently, clinical trials and observational studies involve complex event history data with multiple events. When the observations are independent, the analysis of such studies can be based on standard methods for multistate models. However, the independence assumption is often violated, such as in multicenter studies, which makes standard methods improper. This work addresses the issue of nonparametric estimation and two‐sample testing for the population‐averaged transition and state occupation probabilities under general multistate models with cluster‐correlated, right‐censored, and/or left‐truncated observations. The proposed methods do not impose assumptions regarding the within‐cluster dependence, allow for informative cluster size, and are applicable to both Markov and non‐Markov processes. Using empirical process theory, the estimators are shown to be uniformly consistent and to converge weakly to tight Gaussian processes. Closed‐form variance estimators are derived, rigorous methodology for the calculation of simultaneous confidence bands is proposed, and the asymptotic properties of the nonparametric tests are established. Furthermore, I provide theoretical arguments for the validity of the nonparametric cluster bootstrap, which can be readily implemented in practice regardless of how complex the underlying multistate model is. Simulation studies show that the performance of the proposed methods is good, and that methods that ignore the within‐cluster dependence can lead to invalid inferences. Finally, the methods are illustrated using data from a multicenter randomized controlled trial.
Highlights
Clinical trials and observational studies involve complex multistate event histories
One can use a sufficiently large number of nonparametric cluster bootstraps Δ ∗n,hj(s, t), t ∈ [s, τ], and Δ ∗n,j(t), t ∈ [0, τ] and, √ctiaolnncussulaapstte∈√[r0ne,τa]slu|iWzpatj∈ti([ots,)nτ{]sΔ|∗nWfr,joh(mtj)(t−t)h{ΔΔê ∗nna,hjsj(yt(m)s},|pt.)to−TthicΔenn,hPuj-l(vlsa,dltui)se}t|riacbnaundthen be estimated as the proportion of these simulation realizations, which are greater than or equal to the actual value of the test statistic based on the observed data
We present simulation results for the one-sample case under the working-independence Aalen-Johansen estimator using the usual Greenwood standard
Summary
Clinical trials and observational studies involve complex multistate event histories. O’Keeffe et al (2018) proposed a nonparametric approach for cluster-specific inference based on correlated observations from a general multistate model This approach, similar to the Chen and Zhou (2013) method, accounts for the within-cluster dependence by incorporating random effects. Only Lan et al (2017) proposed a method for nonparametric population-averaged inference about state occupation probabilities in general multistate models, allowing for ICS. This approach is for current status data and not the usual right-censored or lefttruncated multistate data. The methods are illustrated using data from the multicenter EORTC trial 10854
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