Permutation‐based inference for the AUC: A unified approach for continuous and discontinuous data

Aguayo

Staab

2017

Statistics in Medicine

Self Cite

We study inference methods for the analysis of multireader diagnostic trials. In these studies, data are usually collected in terms of a factorial design involving the factors Modality and Reader. Furthermore, repeated measures appear in a natural way since the same patient is observed under different modalities by several readers and the repeated measures may have a quite involved dependency structure. The hypotheses are formulated in terms of the areas under the ROC curves. Currently, only global testing procedures exist for the analysis of such data. We derive rank-based multiple contrast test procedures and simultaneous confidence intervals which take the correlation between the test statistics into account. The procedures allow for testing arbitrary multiple hypotheses. Extensive simulation studies show that the new approaches control the nominal type 1 error rate very satisfactorily. A real data set illustrates the application of the proposed methods.

Section: Discussionmentioning

confidence: 99%

Simultaneous inference for factorial multireader diagnostic trials

Aguayo

Staab

2017

Statistics in Medicine

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“…Again, T BM is asymptotically standard normal under

H_{0}^{p}

and Brunner and Munzel proposed a t ‐approximation for smaller sample sizes. Moreover, the latter was slightly enhanced by a studentized permutation approach leading to the two‐sided permuted Brunner‐Munzel test

φ_{N B} = 1 false{T_{B M} \leq z_{α_{2} false/ 2}^{π} false} + 1 false{T_{B M} \geq z_{1 - α_{2} false/ 2}^{π} false}

, where

z_{1 - α_{2} false/ 2}^{π}

is the corresponding (1 − α 2 /2)‐ permutation quantile . The MCT for testing the hypothesis

H_{0}^{p}

is thus given by φ ( p ) = φ KP · φ NB .…”

Section: Nonparametric Test Proceduresmentioning

confidence: 99%

Multiplication‐combination tests for incomplete paired data

Amro¹,

Pauly

2019

Statistics in Medicine

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We consider statistical procedures for hypothesis testing of real valued functionals of matched pairs with missing values. In order to improve the accuracy of existing methods, we propose a novel multiplication combination procedure.Dividing the observed data into dependent (completely observed) pairs and independent (incompletely observed) components, it is based on combining separate results of adequate tests for the two sub data sets. Our methods can be applied for parametric as well as semiparametric and nonparametric models and make use of all available data. In particular, the approaches are flexible and can be used to test different hypotheses in various models of interest. This is exemplified by a detailed study of mean-as well as rank-based approaches under different missingness mechanisms with different amount of missing data. Extensive simulations show that in most considered situations, the proposed procedures are more accurate than existing competitors particularly for the nonparametric Behrens-Fisher problem. A real data set illustrates the application of the methods.

“…Following the ideas of Neuhaus (), Janssen (, ), Neubert and Brunner (), Pauly (), Konietschke and Pauly (), Omelka and Pauly (), Chung and Romano (, ), Pauly et al . (), Pauly, Asendorf, and Konietschke (), and Smaga (), this problem can be solved by studentizing the statistic

\sqrt{N} {\overset{R}{true}}_{\cdot}^{normalπ}

. However, this is already achieved by the WTS in equation (2.2), where the inner Moore‐Penrose inverse

{false(C {\overset{false^}{V}}_{N} {bold-italicC}^{'} false)}^{+}

acts as a multivariate studentization in this quadratic form.…”

Section: Wald‐type Permutation Statisticmentioning

confidence: 99%

Rank‐based permutation approaches for non‐parametric factorial designs

M¹,

Pauly³

2017

Brit J Math & Statis

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Inference methods for null hypotheses formulated in terms of distribution functions in general non-parametric factorial designs are studied. The methods can be applied to continuous, ordinal or even ordered categorical data in a unified way, and are based only on ranks. In this set-up Wald-type statistics and ANOVA-type statistics are the current state of the art. The first method is asymptotically exact but a rather liberal statistical testing procedure for small to moderate sample size, while the latter is only an approximation which does not possess the correct asymptotic α level under the null. To bridge these gaps, a novel permutation approach is proposed which can be seen as a flexible generalization of the Kruskal-Wallis test to all kinds of factorial designs with independent observations. It is proven that the permutation principle is asymptotically correct while keeping its finite exactness property when data are exchangeable. The results of extensive simulation studies foster these theoretical findings. A real data set exemplifies its applicability.