This paper establishes the asymptotic independence between the quadratic form and maximum of a sequence of independent random variables. Based on this theoretical result, we find the asymptotic joint distribution for the quadratic form and maximum, which can be applied into the high-dimensional testing problems. By combining the sum-type test and the max-type test, we propose the Fisher's combination tests for the one-sample mean test and two-sample mean test. Under this novel general framework, several strong assumptions in existing literature have been relaxed. Monte Carlo simulation has been done which shows that our proposed tests are strongly robust to both sparse and dense data
AbstractA statistic is proposed for testing the equality of the mean vectors in a one-way multivaria...
Capturing dependence among a large number of high dimensional random vectors is a very important and...
In this paper, new tests for the independence of two high-dimensional vectors are investigated. We c...
For a set of dependent random variables, without stationary or the strong mixing assumptions, we der...
Testing large covariance matrices is of fundamental importance in statistical analysis with high-dim...
There is a well-developed statistical inference theory for classical one-dimensional models. However...
Let X-1 , . . . , X-n be a random sample from a p-dimensional population distribution. Assume that c...
It is a difficult problem to test the equality of distribution of two independent p-dimensional (p>1...
A simple statistic is proposed for testing the complete independence of random variables having a mu...
The study of dependence for high dimensional data originates in many different areas of contemporary...
We consider the testing of mutual independence among all entries in a [Formula: see text]-dimensiona...
In this dissertation, we investigate four distinct and interrelated problems for high-dimensional in...
Testing for multi-dimensional white noise is an important subject in statistical inference. Such tes...
Test of independence is of fundamental importance in modern data analysis, with broad applications i...
We develop a powerful quadratic test for the overall significance of many covariates in a dense regr...
AbstractA statistic is proposed for testing the equality of the mean vectors in a one-way multivaria...
Capturing dependence among a large number of high dimensional random vectors is a very important and...
In this paper, new tests for the independence of two high-dimensional vectors are investigated. We c...
For a set of dependent random variables, without stationary or the strong mixing assumptions, we der...
Testing large covariance matrices is of fundamental importance in statistical analysis with high-dim...
There is a well-developed statistical inference theory for classical one-dimensional models. However...
Let X-1 , . . . , X-n be a random sample from a p-dimensional population distribution. Assume that c...
It is a difficult problem to test the equality of distribution of two independent p-dimensional (p>1...
A simple statistic is proposed for testing the complete independence of random variables having a mu...
The study of dependence for high dimensional data originates in many different areas of contemporary...
We consider the testing of mutual independence among all entries in a [Formula: see text]-dimensiona...
In this dissertation, we investigate four distinct and interrelated problems for high-dimensional in...
Testing for multi-dimensional white noise is an important subject in statistical inference. Such tes...
Test of independence is of fundamental importance in modern data analysis, with broad applications i...
We develop a powerful quadratic test for the overall significance of many covariates in a dense regr...
AbstractA statistic is proposed for testing the equality of the mean vectors in a one-way multivaria...
Capturing dependence among a large number of high dimensional random vectors is a very important and...
In this paper, new tests for the independence of two high-dimensional vectors are investigated. We c...