Multivariate and multiple permutation tests

In this article, we consider the use of permutation tests for comparing multivariate parameters from two populations. First, the underlying properties of permutation tests when comparing parameter vectors from two distributions P and Q are developed. Although an exact level α test can be constructed by a permutation test when the fundamental assumption of identical underlying distributions holds, permutation tests have often been misused. Indeed, permutation tests have frequently been applied in cases where the underlying distributions need not be identical under the null hypothesis. In such cases, permutation tests fail to control the Type 1 error, even asymptotically. However, we provide valid procedures in the sense that even when the assumption of identical distributions fails, one can establish the asymptotic validity of permutation tests in general while retaining the exactness property when all the observations are i.i.d. In the multivariate testing problem for testing the global null hypothesis of equality of parameter vectors, a modified Hotelling’s T2-statistic as well as tests based on the maximum of studentized absolute differences are considered. In the latter case, a bootstrap prepivoting test statistic is constructed, which leads to a bootstrapping after permuting algorithm. Then, these tests are applied as a basis for testing multiple hypotheses simultaneously by invoking the closure method to control the Familywise Error Rate. Lastly, Monte Carlo simulation studies and an empirical example are presented.

[1]  Joseph P. Romano,et al.  On the uniform asymptotic validity of subsampling and the bootstrap , 2012, 1204.2762.

[2]  Michael Wolf,et al.  Balanced Control of Generalized Error Rates , 2008 .

[3]  E. L. Lehmann,et al.  Parametric versus nonparametrics: two alternative methodologies , 2009 .

[4]  Arnold J Stromberg,et al.  Subsampling , 2001, Technometrics.

[5]  H. Keselman,et al.  Multivariate Tests of Means in Independent Groups Designs , 2004, Evaluation & the health professions.

[6]  R. Beran Prepivoting Test Statistics: A Bootstrap View of Asymptotic Refinements , 1988 .

[7]  A. Janssen,et al.  How do bootstrap and permutation tests work , 2003 .

[8]  S. Holm A Simple Sequentially Rejective Multiple Test Procedure , 1979 .

[9]  Azeem M. Shaikh,et al.  Consonance and the closure method in multiple testing , 2009 .

[10]  B. Murphy,et al.  Some two-sample tests when the variances are unequal: a simulation study. , 1967, Biometrika.

[11]  Frank Konietschke,et al.  A studentized permutation test for the nonparametric Behrens-Fisher problem in paired data , 2012 .

[12]  W. Hoeffding The Large-Sample Power of Tests Based on Permutations of Observations , 1952 .

[13]  Edgar Brunner,et al.  A studentized permutation test for the non-parametric Behrens-Fisher problem , 2007, Comput. Stat. Data Anal..

[14]  Edgar Brunner,et al.  Asymptotic permutation tests in general factorial designs , 2015 .

[15]  Calyampudi R. Rao,et al.  Joint asymptotic distribution of marginal quantiles and quantile functions in samples from a multivariate population , 1988 .

[16]  Rudolf Beran,et al.  Balanced Simultaneous Confidence Sets , 1988 .

[17]  A. Janssen Resampling student'st-type statistics , 2005 .

[18]  Discussion of ‘Parametric versus nonparametrics: two alternative methodologies’ , 2009 .

[19]  Joseph P. Romano Bootstrap and randomization tests of some nonparametric hypotheses , 1989 .

[20]  K. Gabriel,et al.  On closed testing procedures with special reference to ordered analysis of variance , 1976 .

[21]  R. Simes,et al.  An improved Bonferroni procedure for multiple tests of significance , 1986 .

[22]  A. Janssen,et al.  Testing nonparametric statistical functionals with applications to rank tests , 1999 .

[23]  E. Lehmann,et al.  Nonparametrics: Statistical Methods Based on Ranks , 1976 .

[24]  G. Charness,et al.  Incentives to Exercise , 2008 .

[25]  A. Janssen,et al.  Studentized permutation tests for non-i.i.d. hypotheses and the generalized Behrens-Fisher problem , 1997 .

[26]  Marek Omelka,et al.  Testing equality of correlation coefficients in two populations via permutation methods , 2012 .

[27]  Joseph P. Romano,et al.  Asymptotically valid and exact permutation tests based on two-sample U-statistics , 2016 .

[28]  Markus Pauly Discussion about the quality of F-ratio resampling tests for comparing variances , 2011 .

[29]  Ing Rj Ser Approximation Theorems of Mathematical Statistics , 1980 .

[30]  Lutz Duembgen,et al.  On low-dimensional projections of high-dimensional distributions , 2011, 1107.0417.

[31]  Discussion of ‘Parametric versus nonparametrics: two alternative methdologies’ , 2009 .

[32]  A. Janssen RESAMPLING STUDENT ' S t-TYPE STATISTICS , 2005 .

[33]  Arnold Janssen,et al.  A Monte Carlo comparison of studentized bootstrap and permutation tests for heteroscedastic two-sample problems , 2005, Comput. Stat..

[34]  Stephen E. Fienberg,et al.  Testing Statistical Hypotheses , 2005 .

[35]  E. Lehmann Elements of large-sample theory , 1998 .

[36]  A. V. D. Vaart,et al.  Asymptotic Statistics: U -Statistics , 1998 .

[37]  Joseph P. Romano On the behaviour of randomization tests without the group invariance assumption , 1990 .

[38]  Joseph P. Romano,et al.  EXACT AND ASYMPTOTICALLY ROBUST PERMUTATION TESTS , 2013, 1304.5939.

[39]  Thomas J. DiCiccio,et al.  On Smoothing and the Bootstrap , 1989 .

[40]  David Hinkley,et al.  Bootstrap Methods: Another Look at the Jackknife , 2008 .

[41]  G. Neuhaus,et al.  Conditional Rank Tests for the Two-Sample Problem Under Random Censorship , 1993 .