New Bounds on 2-Frameproof Codes of Length 4
© 2020 Penying Rochanakul. Frameproof codes were first introduced by Boneh and Shaw in 1998 in the context of digital fingerprinting to protect copyrighted materials. These digital fingerprints are generally denoted as codewords in Qn, where Q is an alphabet of size q and n is a positive integer. A...
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th-cmuir.6653943832-684622020-04-02T15:27:45Z New Bounds on 2-Frameproof Codes of Length 4 Penying Rochanakul Mathematics © 2020 Penying Rochanakul. Frameproof codes were first introduced by Boneh and Shaw in 1998 in the context of digital fingerprinting to protect copyrighted materials. These digital fingerprints are generally denoted as codewords in Qn, where Q is an alphabet of size q and n is a positive integer. A 2-frameproof code is a code C such that any 2 codewords in C cannot form a new codeword under a particular rule. Thus, no pair of users can frame a user who is not a member of the coalition. This paper concentrates on the upper bound for the size of a q-ary 2-frameproof code of length 4. Our new upper bound shows that C≤2q2-2q+1 when q is odd and q>10. 2020-04-02T15:27:45Z 2020-04-02T15:27:45Z 2020-01-01 Journal 16870425 01611712 2-s2.0-85079067889 10.1155/2020/4879108 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85079067889&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/68462 |
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Mathematics |
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Mathematics Penying Rochanakul New Bounds on 2-Frameproof Codes of Length 4 |
| description |
© 2020 Penying Rochanakul. Frameproof codes were first introduced by Boneh and Shaw in 1998 in the context of digital fingerprinting to protect copyrighted materials. These digital fingerprints are generally denoted as codewords in Qn, where Q is an alphabet of size q and n is a positive integer. A 2-frameproof code is a code C such that any 2 codewords in C cannot form a new codeword under a particular rule. Thus, no pair of users can frame a user who is not a member of the coalition. This paper concentrates on the upper bound for the size of a q-ary 2-frameproof code of length 4. Our new upper bound shows that C≤2q2-2q+1 when q is odd and q>10. |
| format |
Journal |
| author |
Penying Rochanakul |
| author_facet |
Penying Rochanakul |
| author_sort |
Penying Rochanakul |
| title |
New Bounds on 2-Frameproof Codes of Length 4 |
| title_short |
New Bounds on 2-Frameproof Codes of Length 4 |
| title_full |
New Bounds on 2-Frameproof Codes of Length 4 |
| title_fullStr |
New Bounds on 2-Frameproof Codes of Length 4 |
| title_full_unstemmed |
New Bounds on 2-Frameproof Codes of Length 4 |
| title_sort |
new bounds on 2-frameproof codes of length 4 |
| publishDate |
2020 |
| url |
https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85079067889&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/68462 |
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