Tail Bounds for Canonical U-Statistics and U-Processes with Unbounded Kernels
Abstract
In this paper, we prove exponential tail bounds for canonical (or degenerate) U-statistics and U-processes under exponential-type tail assumptions on the kernels. Most of the existing results in the relevant literature often assume bounded kernels or obtain sub-optimal tail behavior under unbounded kernels. We obtain sharp rates and optimal tail behavior under sub-Weibull kernel functions. Some examples from nonparametric and semiparametric statistics literature are considered.
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