We are interesting in the error exponent for source coding with fidelity criterion. For each fixed distortion level Δ, the maximum attainable error exponent at rate R, as a function of R, is called the reliability function. The minimum rate achieving the given error exponent is called the minimum achievable rate. For memoryless sources with finite alphabet, Marton (1974) gave an expression of the reliability function. The aim of the paper is to derive formulas for the reliability function and the minimum achievable rate for memoryless Gaussian sources.
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Shunsuke IHARA, Masashi KUBO, "Error Exponent for Coding of Memoryless Gaussian Sources with a Fidelity Criterion" in IEICE TRANSACTIONS on Fundamentals,
vol. E83-A, no. 10, pp. 1891-1897, October 2000, doi: .
Abstract: We are interesting in the error exponent for source coding with fidelity criterion. For each fixed distortion level Δ, the maximum attainable error exponent at rate R, as a function of R, is called the reliability function. The minimum rate achieving the given error exponent is called the minimum achievable rate. For memoryless sources with finite alphabet, Marton (1974) gave an expression of the reliability function. The aim of the paper is to derive formulas for the reliability function and the minimum achievable rate for memoryless Gaussian sources.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/e83-a_10_1891/_p
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@ARTICLE{e83-a_10_1891,
author={Shunsuke IHARA, Masashi KUBO, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={Error Exponent for Coding of Memoryless Gaussian Sources with a Fidelity Criterion},
year={2000},
volume={E83-A},
number={10},
pages={1891-1897},
abstract={We are interesting in the error exponent for source coding with fidelity criterion. For each fixed distortion level Δ, the maximum attainable error exponent at rate R, as a function of R, is called the reliability function. The minimum rate achieving the given error exponent is called the minimum achievable rate. For memoryless sources with finite alphabet, Marton (1974) gave an expression of the reliability function. The aim of the paper is to derive formulas for the reliability function and the minimum achievable rate for memoryless Gaussian sources.},
keywords={},
doi={},
ISSN={},
month={October},}
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TY - JOUR
TI - Error Exponent for Coding of Memoryless Gaussian Sources with a Fidelity Criterion
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 1891
EP - 1897
AU - Shunsuke IHARA
AU - Masashi KUBO
PY - 2000
DO -
JO - IEICE TRANSACTIONS on Fundamentals
SN -
VL - E83-A
IS - 10
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - October 2000
AB - We are interesting in the error exponent for source coding with fidelity criterion. For each fixed distortion level Δ, the maximum attainable error exponent at rate R, as a function of R, is called the reliability function. The minimum rate achieving the given error exponent is called the minimum achievable rate. For memoryless sources with finite alphabet, Marton (1974) gave an expression of the reliability function. The aim of the paper is to derive formulas for the reliability function and the minimum achievable rate for memoryless Gaussian sources.
ER -