Resumen de Fano’s Inequality for Random Variables
Sébastien Gerchinovitz, Pierre Ménard, Gilles Stoltz
We extend Fano’s inequality, which controls the average probability of events in terms of the average of some f-divergences, to work with arbitrary events (not necessarily forming a partition) and even with arbitrary [0,1]-valued random variables, possibly in continuously infinite number. We provide two applications of these extensions, in which the consideration of random variables is particularly handy: we offer new and elegant proofs for existing lower bounds, on Bayesian posterior concentration (minimax or distribution-dependent) rates and on the regret in nonstochastic sequential learning.
