We consider the testing of mutual independence among all entries in a [Formula: see text]-dimensional random vector based on [Formula: see text] independent observations. We study two families of distribution-free test statistics, which include Kendall's tau and Spearman's rho as important examples. We show that under the null hypothesis the test statistics of these two families converge weakly to Gumbel distributions, and we propose tests that control the Type I error in the high-dimensional setting where [Formula: see text]. We further show that the two tests are rate-optimal in terms of power against sparse alternatives and that they outperform competitors in simulations, especially when [Formula: see text] is large
For a set of dependent random variables, without stationary or the strong mixing assumptions, we der...
Rank correlations have found many innovative applications in the last decade. In particular,suitable...
Defining multivariate generalizations of the classical univariate ranks has been a long-standing ope...
We consider the testing of mutual independence among all entries in a [Formula: see text]-dimensiona...
Abstract. A popular approach for testing if two univariate random variables are statis-tically indep...
This paper presents a quick test of independence against a high-dimensional alternative. The test is...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Test of independence is of fundamental importance in modern data analysis, with broad applications i...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Thesis (Ph.D.)--University of Washington, 2021Testing independence is a fundamental statistical prob...
New test statistics are proposed for testing whether two random vectors are independent. Gieser and ...
AbstractA class of distribution-free tests is proposed for the independence of two subsets of respon...
In this paper, we are concerned with the independence test for kk high-dimensional sub-vectors of a ...
We propose a new class of nonparametric tests for the supposition of independence between two contin...
For a set of dependent random variables, without stationary or the strong mixing assumptions, we der...
Rank correlations have found many innovative applications in the last decade. In particular,suitable...
Defining multivariate generalizations of the classical univariate ranks has been a long-standing ope...
We consider the testing of mutual independence among all entries in a [Formula: see text]-dimensiona...
Abstract. A popular approach for testing if two univariate random variables are statis-tically indep...
This paper presents a quick test of independence against a high-dimensional alternative. The test is...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Test of independence is of fundamental importance in modern data analysis, with broad applications i...
Three simple and explicit procedures for testing the independence of two multi-dimensional random va...
Thesis (Ph.D.)--University of Washington, 2021Testing independence is a fundamental statistical prob...
New test statistics are proposed for testing whether two random vectors are independent. Gieser and ...
AbstractA class of distribution-free tests is proposed for the independence of two subsets of respon...
In this paper, we are concerned with the independence test for kk high-dimensional sub-vectors of a ...
We propose a new class of nonparametric tests for the supposition of independence between two contin...
For a set of dependent random variables, without stationary or the strong mixing assumptions, we der...
Rank correlations have found many innovative applications in the last decade. In particular,suitable...
Defining multivariate generalizations of the classical univariate ranks has been a long-standing ope...