Testability of high-dimensional linear models with non-sparse structures
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This paper studies hypothesis testing and confidence interval construction in high-dimensional linear models with possible non-sparse structures. For a given component of the parameter vector, we show that the difficulty of the problem depends on the sparsity of the corresponding row of the precision matrix of the covariates, not the sparsity of the model itself. We develop new concepts of uniform and essentially uniform non-testability that allow the study of limitations of tests across a broad set of alternatives. Uniform non-testability identifies an extensive collection of alternatives such that the power of any test, against any alternative in this group, is asymptotically at most equal to the nominal size, whereas minimaxity shows the existence of one particularly "bad" alternative. Implications of the new constructions include new minimax testability results that in sharp contrast to existing results do not depend on the sparsity of the model parameters. We identify new tradeoffs between testability and feature correlation. In particular, we show that in models with weak feature correlations minimax lower bound can be attained by a confidence interval whose width has the parametric rate regardless of the size of the model sparsity.
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