The dispersion of lossy source coding

Amir Ingber; Yuval Kochman

doi:https://doi.org/10.1109/DCC.2011.13

The dispersion of lossy source coding

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

In this work we investigate the behavior of the minimal rate needed in order to guarantee a given probability that the distortion exceeds a prescribed threshold, at some fixed finite quantization block length. We show that the excess coding rate above the rate-distortion function is inversely proportional (to the first order) to the square root of the block length. We give an explicit expression for the proportion constant, which is given by the inverse Q-function of the allowed excess distortion probability, times the square root of a constant, termed the excess distortion dispersion. This result is the dual of a corresponding channel coding result, where the dispersion above is the dual of the channel dispersion. The work treats discrete memoryless sources, as well as the quadratic-Gaussian case.

Original language	English
Title of host publication	Proceedings - DCC 2011
Subtitle of host publication	2011 Data Compression Conference
Pages	53-62
Number of pages	10
DOIs	https://doi.org/10.1109/DCC.2011.13
State	Published - 2011
Externally published	Yes
Event	2011 Data Compression Conference, DCC 2011 - Snowbird, UT, United States Duration: 29 Mar 2011 → 31 Mar 2011

Publication series

Name	Data Compression Conference Proceedings

Conference

Conference	2011 Data Compression Conference, DCC 2011
Country/Territory	United States
City	Snowbird, UT
Period	29/03/11 → 31/03/11

Keywords

Central limit theorem
Dispersion
Excess distortion exponent
Rate disortion

All Science Journal Classification (ASJC) codes

Computer Networks and Communications

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https://doi.org/10.1109/DCC.2011.13

Cite this

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title = "The dispersion of lossy source coding",

abstract = "In this work we investigate the behavior of the minimal rate needed in order to guarantee a given probability that the distortion exceeds a prescribed threshold, at some fixed finite quantization block length. We show that the excess coding rate above the rate-distortion function is inversely proportional (to the first order) to the square root of the block length. We give an explicit expression for the proportion constant, which is given by the inverse Q-function of the allowed excess distortion probability, times the square root of a constant, termed the excess distortion dispersion. This result is the dual of a corresponding channel coding result, where the dispersion above is the dual of the channel dispersion. The work treats discrete memoryless sources, as well as the quadratic-Gaussian case.",

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doi = "https://doi.org/10.1109/DCC.2011.13",

language = "الإنجليزيّة",

isbn = "9780769543529",

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booktitle = "Proceedings - DCC 2011",

note = "2011 Data Compression Conference, DCC 2011 ; Conference date: 29-03-2011 Through 31-03-2011",

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T1 - The dispersion of lossy source coding

AU - Ingber, Amir

AU - Kochman, Yuval

PY - 2011

Y1 - 2011

N2 - In this work we investigate the behavior of the minimal rate needed in order to guarantee a given probability that the distortion exceeds a prescribed threshold, at some fixed finite quantization block length. We show that the excess coding rate above the rate-distortion function is inversely proportional (to the first order) to the square root of the block length. We give an explicit expression for the proportion constant, which is given by the inverse Q-function of the allowed excess distortion probability, times the square root of a constant, termed the excess distortion dispersion. This result is the dual of a corresponding channel coding result, where the dispersion above is the dual of the channel dispersion. The work treats discrete memoryless sources, as well as the quadratic-Gaussian case.

AB - In this work we investigate the behavior of the minimal rate needed in order to guarantee a given probability that the distortion exceeds a prescribed threshold, at some fixed finite quantization block length. We show that the excess coding rate above the rate-distortion function is inversely proportional (to the first order) to the square root of the block length. We give an explicit expression for the proportion constant, which is given by the inverse Q-function of the allowed excess distortion probability, times the square root of a constant, termed the excess distortion dispersion. This result is the dual of a corresponding channel coding result, where the dispersion above is the dual of the channel dispersion. The work treats discrete memoryless sources, as well as the quadratic-Gaussian case.

KW - Central limit theorem

KW - Dispersion

KW - Excess distortion exponent

KW - Rate disortion

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M3 - منشور من مؤتمر

SN - 9780769543529

T3 - Data Compression Conference Proceedings

SP - 53

EP - 62

BT - Proceedings - DCC 2011

T2 - 2011 Data Compression Conference, DCC 2011

Y2 - 29 March 2011 through 31 March 2011

ER -

The dispersion of lossy source coding

Abstract

Publication series

Conference

Keywords

All Science Journal Classification (ASJC) codes

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