Classical asymptotic theory for statistical inference usually involves calibrating a statistic by fixing the dimension $d$ while letting the sample size $n$ increase to infinity. Recently, much effort has been dedicated towards understanding how these methods behave in high-dimensional settings, where $d$ and $n$ both increase to infinity together. This often leads to different inference procedures, depending on the assumptions about the dimensionality, leaving the practitioner in a bind: given a dataset with 100 samples in 20 dimensions, should they calibrate by assuming $n \gg d$, or $d/n \approx 0.2$? This paper considers the goal of dimension-agnostic inference; developing methods whose validity does not depend on any assumption on $d$ ...
This paper proposes inferential methods for high-dimensional repeated measures in factorial designs....
This thesis considers in the high dimensional setting two canonical testing problems in multivariate...
Fan et al. (2015) recently introduced a remarkable method for increasing asymptotic power of tests i...
Owing to the advances in the science and technology, there is a surge of interest in high-dimensiona...
There is a well-developed statistical inference theory for classical one-dimensional models. However...
International audienceFor tests based on nonparametric methods, power crucially depends on the dimen...
Inference in a high-dimensional situation may involve regularization of a certain form to treat over...
Statistical inference is a procedure of using collected observations to deduce properties of the und...
High dimension, low sample size data are emerging in various areas of science. We find a common stru...
Testing the equality of two means is a fundamental inference problem. For high-dimensional data, the...
We propose a novel technique to boost the power of testing a high-dimensional vector H: θ = 0 agains...
We extend a test of subsphericity to the high-dimensional Gaussian regime where the spikes diverge t...
We consider the hypothesis testing problem of detecting a shift between the means of two mu...
Maximum Mean Discrepancy (MMD) has been widely used in the areas of machine learning and statistics ...
This paper is about two related decision theoretic problems, nonparametric two-sample testing and in...
This paper proposes inferential methods for high-dimensional repeated measures in factorial designs....
This thesis considers in the high dimensional setting two canonical testing problems in multivariate...
Fan et al. (2015) recently introduced a remarkable method for increasing asymptotic power of tests i...
Owing to the advances in the science and technology, there is a surge of interest in high-dimensiona...
There is a well-developed statistical inference theory for classical one-dimensional models. However...
International audienceFor tests based on nonparametric methods, power crucially depends on the dimen...
Inference in a high-dimensional situation may involve regularization of a certain form to treat over...
Statistical inference is a procedure of using collected observations to deduce properties of the und...
High dimension, low sample size data are emerging in various areas of science. We find a common stru...
Testing the equality of two means is a fundamental inference problem. For high-dimensional data, the...
We propose a novel technique to boost the power of testing a high-dimensional vector H: θ = 0 agains...
We extend a test of subsphericity to the high-dimensional Gaussian regime where the spikes diverge t...
We consider the hypothesis testing problem of detecting a shift between the means of two mu...
Maximum Mean Discrepancy (MMD) has been widely used in the areas of machine learning and statistics ...
This paper is about two related decision theoretic problems, nonparametric two-sample testing and in...
This paper proposes inferential methods for high-dimensional repeated measures in factorial designs....
This thesis considers in the high dimensional setting two canonical testing problems in multivariate...
Fan et al. (2015) recently introduced a remarkable method for increasing asymptotic power of tests i...