Optimal entropy estimation on large alphabet: fundamental limits and fast algorithms

Yang, Pengkun

Permalink

https://hdl.handle.net/2142/90776 Copy

Description

Title

Optimal entropy estimation on large alphabet: fundamental limits and fast algorithms

Author(s)

Yang, Pengkun

Issue Date

2016-04-19

Director of Research (if dissertation) or Advisor (if thesis)

Wu, Yihong

Department of Study

Electrical & Computer Eng

Discipline

Electrical & Computer Engr

Degree Granting Institution

University of Illinois at Urbana-Champaign

Degree Name

M.S.

Degree Level

Thesis

Keyword(s)

• entropy estimation
• large alphabet

Abstract

Consider the problem of estimating the Shannon entropy of a distribution over k elements from n independent samples. We obtain the minimax mean- square error within universal multiplicative constant factors if n exceeds a constant factor of k/log(k); otherwise there exists no consistent estimator. This refines the recent result of Valiant and Valiant (2011) that the mini- mal sample size for consistent entropy estimation scales. The apparatus of best polynomial approximation plays a key role in both the construction of optimal estimators and, via a duality argument, the minimax lower bound.

Graduation Semester

2016-05

Type of Resource

text

Permalink

http://hdl.handle.net/2142/90776

Copyright and License Information

Copyright 2016 Pengkun Yang

Owning Collections