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“moment-aware" improvements incorporate higher moments or mean constraints via convexity arguments to tighten Hoeffding-type exponents within the same Chernoff framework. ➡️ i think this means like talagrand
From, Steven G., and Andrew W. Swift. ”A refinement of Hoeffding’s inequality.” Journal of Statistical Computation and Simulation 83.5 (2013): 977-983.▶️ This paper assumes you know $E[X_i]$ for each $i$, and all intervals are equal [0,1] intervals. We may be able to avoid comparing with this numerically as that is a lot more than we assume. Merits more thought.
Hertz, David. ”Improved Hoeffding’s Lemma and Hoeffding’s Tail Bounds.” arXiv preprint arXiv:2012.03535 (2020).▶️ This paper also assumes you know per var means (to know whether each variable mean is less than or more than the middle of its interval. It's not clear that numerical comparison makes much sense here.
“moment-aware" improvements incorporate higher moments or mean constraints via convexity arguments to tighten Hoeffding-type exponents within the same Chernoff framework.➡️ i think this means like talagrandFrom, Steven G., and Andrew W. Swift. ”A refinement of Hoeffding’s inequality.” Journal of Statistical Computation and Simulation 83.5 (2013): 977-983.Hertz, David. ”Improved Hoeffding’s Lemma and Hoeffding’s Tail Bounds.” arXiv preprint arXiv:2012.03535 (2020).Keeping some sources here