Revision as of 13:20, 22 March 2019 edit David Eppstein (talk \| contribs) Autopatrolled, Administrators 235,645 edits Undid revision 888928174 by 46.208.152.26 (talk) There is no requirement to clog up sentences with inessential parentheticals Tag: Undo ← Previous edit		Revision as of 09:53, 16 June 2019 edit undo Patrick (talk \| contribs) Edit filter managers, Administrators 68,638 edits "typically a variable-length code" is somewhat confusing, since every fixed-length code is a prefix code Next edit →
Line 1: A '''prefix code''' is a type of [[code]] system ~~(typically a [[variable-length code]])~~ distinguished by its possession of the "prefix property", which requires that there is no whole [[code word]] in the system that is a [[prefix (computer science)\|prefix]] (initial segment) of any other code word in the system. For example, a code with code words {9, 55} has the prefix property; a code consisting of {9, 5, 59, 55} does not, because "5" is a prefix of "59" and also of "55". A prefix code is a [[uniquely decodable code]]: given a complete and accurate sequence, a receiver can identify each word without requiring a special marker between words. However, there are uniquely decodable codes that are not prefix codes; for instance, the reverse of a prefix code is still uniquely decodable (it is a suffix code), but it is not necessarily a prefix code. Prefix codes are also known as '''prefix-free codes''', '''prefix condition codes''' and '''instantaneous codes'''. Although [[Huffman coding]] is just one of many algorithms for deriving prefix codes, prefix codes are also widely referred to as "Huffman codes", even when the code was not produced by a Huffman algorithm. The term '''comma-free code''' is sometimes also applied as a synonym for prefix-free codes<ref>US [[Federal Standard 1037C]]</ref><ref>{{citation\|title=ATIS Telecom Glossary 2007\|url=http://www.atis.org/glossary/definition.aspx?id=6416\|accessdate=December 4, 2010}}</ref> but in most mathematical books and articles (e.g.<ref>{{citation\|last1=Berstel\|first1=Jean\|last2=Perrin\|first2=Dominique\|title=Theory of Codes\|publisher=Academic Press\|year=1985}}</ref><ref>{{citation\|doi=10.4153/CJM-1958-023-9\|last1=Golomb\|first1=S. W.\|author1-link=Solomon W. Golomb\|last2=Gordon\|first2=Basil\|author2-link=Basil Gordon\|last3=Welch\|first3=L. R.\|title=Comma-Free Codes\|journal=Canadian Journal of Mathematics\|volume=10\|issue=2\|pages=202–209\|year=1958\|url=https://books.google.com/books?id=oRgtS14oa-sC&pg=PA202}}</ref>) a comma-free code is used to mean a [[self-synchronizing code]], a subclass of prefix codes.

Prefix code: Difference between revisions