On the Symmetry of Limiting Distributions of M-estimators
Abstract
Many functionals of interest in statistics and machine learning can be written as minimizers of expected loss functions. Such functionals are called M-estimands, and can be estimated by M-estimators -- minimizers of empirical average losses. Traditionally, statistical inference (e.g., hypothesis tests and confidence sets) for M-estimands is obtained by proving asymptotic normality of M-estimators centered at the target. However, asymptotic normality is only one of several possible limiting distributions and (asymptotically) valid inference becomes significantly difficult with non-normal limits. In this paper, we provide conditions for the symmetry of three general classes of limiting distributions, enabling inference using HulC (Kuchibhotla et al. (2024)).
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