Nonparametric Estimation of Renyi Divergence and Friends

Akshay Krishnamurthy; Kirthevasan Kandasamy; Barnabas Poczos; Larry Wasserman

Nonparametric Estimation of Renyi Divergence and Friends

Akshay Krishnamurthy, Kirthevasan Kandasamy, Barnabas Poczos, Larry Wasserman

Proceedings of the 31st International Conference on Machine Learning, PMLR 32(2):919-927, 2014.

Abstract

We consider nonparametric estimation of L_2, Renyi-αand Tsallis-αdivergences between continuous distributions. Our approach is to construct estimators for particular integral functionals of two densities and translate them into divergence estimators. For the integral functionals, our estimators are based on corrections of a preliminary plug-in estimator. We show that these estimators achieve the parametric convergence rate of n^-1/2 when the densities’ smoothness, s, are both at least d/4 where d is the dimension. We also derive minimax lower bounds for this problem which confirm that s > d/4 is necessary to achieve the n^-1/2 rate of convergence. We validate our theoretical guarantees with a number of simulations.

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BibTeX


@InProceedings{pmlr-v32-krishnamurthy14,
  title = 	 {Nonparametric Estimation of Renyi Divergence and Friends},
  author = 	 {Krishnamurthy, Akshay and Kandasamy, Kirthevasan and Poczos, Barnabas and Wasserman, Larry},
  booktitle = 	 {Proceedings of the 31st International Conference on Machine Learning},
  pages = 	 {919--927},
  year = 	 {2014},
  editor = 	 {Xing, Eric P. and Jebara, Tony},
  volume = 	 {32},
  number =       {2},
  series = 	 {Proceedings of Machine Learning Research},
  address = 	 {Bejing, China},
  month = 	 {22--24 Jun},
  publisher =    {PMLR},
  pdf = 	 {http://proceedings.mlr.press/v32/krishnamurthy14.pdf},
  url = 	 {https://proceedings.mlr.press/v32/krishnamurthy14.html},
  abstract = 	 {We consider nonparametric estimation of L_2, Renyi-αand Tsallis-αdivergences between continuous distributions. Our approach is to construct estimators for particular integral functionals of two densities and translate them into divergence estimators. For the integral functionals, our estimators are based on corrections of a preliminary plug-in estimator. We show that these estimators achieve the parametric convergence rate of n^-1/2 when the densities’ smoothness, s, are both at least d/4 where d is the dimension. We also derive minimax lower bounds for this problem which confirm that s > d/4 is necessary to achieve the n^-1/2 rate of convergence. We validate our theoretical guarantees with a number of simulations.}
}

Endnote

%0 Conference Paper
%T Nonparametric Estimation of Renyi Divergence and Friends
%A Akshay Krishnamurthy
%A Kirthevasan Kandasamy
%A Barnabas Poczos
%A Larry Wasserman
%B Proceedings of the 31st International Conference on Machine Learning
%C Proceedings of Machine Learning Research
%D 2014
%E Eric P. Xing
%E Tony Jebara	
%F pmlr-v32-krishnamurthy14
%I PMLR
%P 919--927
%U https://proceedings.mlr.press/v32/krishnamurthy14.html
%V 32
%N 2
%X We consider nonparametric estimation of L_2, Renyi-αand Tsallis-αdivergences between continuous distributions. Our approach is to construct estimators for particular integral functionals of two densities and translate them into divergence estimators. For the integral functionals, our estimators are based on corrections of a preliminary plug-in estimator. We show that these estimators achieve the parametric convergence rate of n^-1/2 when the densities’ smoothness, s, are both at least d/4 where d is the dimension. We also derive minimax lower bounds for this problem which confirm that s > d/4 is necessary to achieve the n^-1/2 rate of convergence. We validate our theoretical guarantees with a number of simulations.

RIS


TY  - CPAPER
TI  - Nonparametric Estimation of Renyi Divergence and Friends
AU  - Akshay Krishnamurthy
AU  - Kirthevasan Kandasamy
AU  - Barnabas Poczos
AU  - Larry Wasserman
BT  - Proceedings of the 31st International Conference on Machine Learning
DA  - 2014/06/18
ED  - Eric P. Xing
ED  - Tony Jebara	
ID  - pmlr-v32-krishnamurthy14
PB  - PMLR
DP  - Proceedings of Machine Learning Research
VL  - 32
IS  - 2
SP  - 919
EP  - 927
L1  - http://proceedings.mlr.press/v32/krishnamurthy14.pdf
UR  - https://proceedings.mlr.press/v32/krishnamurthy14.html
AB  - We consider nonparametric estimation of L_2, Renyi-αand Tsallis-αdivergences between continuous distributions. Our approach is to construct estimators for particular integral functionals of two densities and translate them into divergence estimators. For the integral functionals, our estimators are based on corrections of a preliminary plug-in estimator. We show that these estimators achieve the parametric convergence rate of n^-1/2 when the densities’ smoothness, s, are both at least d/4 where d is the dimension. We also derive minimax lower bounds for this problem which confirm that s > d/4 is necessary to achieve the n^-1/2 rate of convergence. We validate our theoretical guarantees with a number of simulations.
ER  -

APA


Krishnamurthy, A., Kandasamy, K., Poczos, B. & Wasserman, L.. (2014). Nonparametric Estimation of Renyi Divergence and Friends. Proceedings of the 31st International Conference on Machine Learning, in Proceedings of Machine Learning Research 32(2):919-927 Available from https://proceedings.mlr.press/v32/krishnamurthy14.html.

Nonparametric Estimation of Renyi Divergence and Friends

Abstract

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