On the Estimation of Gaussian Moment Tensors
Abstract
This paper studies two estimators for Gaussian moment tensors: the standard sample moment estimator and a plug-in estimator based on Isserlis's theorem. We establish dimension-free, non-asymptotic error bounds that demonstrate and quantify the advantage of Isserlis's estimator for tensors of even order p>2. Our bounds hold in operator and entrywise maximum norms, and apply to symmetric and asymmetric tensors.
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