We consider both finite and infinite power chi expansions of $f$-divergences
derived from Taylor's expansions of smooth generators, and elaborate on cases
where these expansions yield closed-form formula, bounded approximations, or
analytic divergence series expressions of $f$-divergences.
Description
[1903.05818] On power chi expansions of $f$-divergences
%0 Journal Article
%1 nielsen2019power
%A Nielsen, Frank
%A Hadjeres, Gaëtan
%D 2019
%K divergences entropy information theory
%T On power chi expansions of $f$-divergences
%U http://arxiv.org/abs/1903.05818
%X We consider both finite and infinite power chi expansions of $f$-divergences
derived from Taylor's expansions of smooth generators, and elaborate on cases
where these expansions yield closed-form formula, bounded approximations, or
analytic divergence series expressions of $f$-divergences.
@article{nielsen2019power,
abstract = {We consider both finite and infinite power chi expansions of $f$-divergences
derived from Taylor's expansions of smooth generators, and elaborate on cases
where these expansions yield closed-form formula, bounded approximations, or
analytic divergence series expressions of $f$-divergences.},
added-at = {2019-12-11T14:20:09.000+0100},
author = {Nielsen, Frank and Hadjeres, Gaëtan},
biburl = {https://www.bibsonomy.org/bibtex/25f28dadac944b30afb0ebc0b6b3bfd8c/kirk86},
description = {[1903.05818] On power chi expansions of $f$-divergences},
interhash = {977384dd6cd132a04f13a9021983f4d5},
intrahash = {5f28dadac944b30afb0ebc0b6b3bfd8c},
keywords = {divergences entropy information theory},
note = {cite arxiv:1903.05818Comment: 21 pages},
timestamp = {2019-12-11T14:20:09.000+0100},
title = {On power chi expansions of $f$-divergences},
url = {http://arxiv.org/abs/1903.05818},
year = 2019
}