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Shannon entropy estimation for linear processes

Published 8 Sep 2020 in math.ST, stat.ME, and stat.TH | (2009.03472v2)

Abstract: In this paper, we estimate the Shannon entropy $S(f) = -\E[ \log (f(x))]$ of a one-sided linear process with probability density function $f(x)$. We employ the integral estimator $S_n(f)$, which utilizes the standard kernel density estimator $f_n(x)$ of $f(x)$. We show that $S_n (f)$ converges to $S(f)$ almost surely and in $\L2$ under reasonable conditions.

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