Presentation | 2020-12-02 Error exponent of probability that optimal strategy will fail under cost and profit constraints Kiminori Iriyama, |
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PDF Download Page | PDF download Page Link |
Abstract(in Japanese) | (See Japanese page) |
Abstract(in English) | In information theory, it is interesting to study the exponential rate when the error probability exponentially converges to 0 under a given condition, and it is formulated as a problem to determine the reliability function. Recently, we have derived a formula for the reliability function when the coding system satisfies subadditivity. The purpose of this paper is to apply the formula of the reliability function to derive a formula that determines the error exponent of the probability that the optimal strategy will fail under cost and benefit constraints. |
Keyword(in Japanese) | (See Japanese page) |
Keyword(in English) | cost and benefit / error exponent / subadditivity / reliability function |
Paper # | IT2020-36 |
Date of Issue | 2020-11-24 (IT) |
Conference Information | |
Committee | IT |
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Conference Date | 2020/12/1(3days) |
Place (in Japanese) | (See Japanese page) |
Place (in English) | Online |
Topics (in Japanese) | (See Japanese page) |
Topics (in English) | Lectures for Young Researchers, General |
Chair | Tadashi Wadayama(Nagoya Inst. of Tech.) |
Vice Chair | Tetsuya Kojima(Tokyo Kosen) |
Secretary | Tetsuya Kojima(Yamaguchi Univ.) |
Assistant | Takahiro Ohta(Senshu Univ.) |
Paper Information | |
Registration To | Technical Committee on Information Theory |
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Language | JPN |
Title (in Japanese) | (See Japanese page) |
Sub Title (in Japanese) | (See Japanese page) |
Title (in English) | Error exponent of probability that optimal strategy will fail under cost and profit constraints |
Sub Title (in English) | |
Keyword(1) | cost and benefit |
Keyword(2) | error exponent |
Keyword(3) | subadditivity |
Keyword(4) | reliability function |
1st Author's Name | Kiminori Iriyama |
1st Author's Affiliation | *(*) |
Date | 2020-12-02 |
Paper # | IT2020-36 |
Volume (vol) | vol.120 |
Number (no) | IT-268 |
Page | pp.pp.67-72(IT), |
#Pages | 6 |
Date of Issue | 2020-11-24 (IT) |