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- Ternary_Golay_code abstract "In coding theory, the ternary Golay codes are two closely related error-correcting codes.The code generally known simply as the ternary Golay code is an -code, that is, it is a linear code over a ternary alphabet; the relative distance of the code is as large as it possibly can be for a ternary code, and hence, the ternary Golay code is a perfect code.The extended ternary Golay code is a [12, 6, 6] linear code obtained by adding a zero-sum check digit to the [11, 6, 5] code.In finite group theory, the extended ternary Golay code is sometimes referred to as the ternary Golay code.[citation needed]".
- Ternary_Golay_code wikiPageExternalLink BF03025254.
- Ternary_Golay_code wikiPageID "3070794".
- Ternary_Golay_code wikiPageRevisionID "551992566".
- Ternary_Golay_code alphabetSize "3".
- Ternary_Golay_code blockLength "11".
- Ternary_Golay_code blockLength "12".
- Ternary_Golay_code distance "5".
- Ternary_Golay_code distance "6".
- Ternary_Golay_code hasPhotoCollection Ternary_Golay_code.
- Ternary_Golay_code messageLength "6".
- Ternary_Golay_code name "Extended ternary Golay code".
- Ternary_Golay_code name "Perfect ternary Golay code".
- Ternary_Golay_code namesake Marcel_J._E._Golay.
- Ternary_Golay_code notation "-code".
- Ternary_Golay_code rate "6".
- Ternary_Golay_code type Block_code.
- Ternary_Golay_code subject Category:Coding_theory.
- Ternary_Golay_code subject Category:Finite_fields.
- Ternary_Golay_code type Abstraction100002137.
- Ternary_Golay_code type Code106667317.
- Ternary_Golay_code type Communication100033020.
- Ternary_Golay_code type WrittenCommunication106349220.
- Ternary_Golay_code comment "In coding theory, the ternary Golay codes are two closely related error-correcting codes.The code generally known simply as the ternary Golay code is an -code, that is, it is a linear code over a ternary alphabet; the relative distance of the code is as large as it possibly can be for a ternary code, and hence, the ternary Golay code is a perfect code.The extended ternary Golay code is a [12, 6, 6] linear code obtained by adding a zero-sum check digit to the [11, 6, 5] code.In finite group theory, the extended ternary Golay code is sometimes referred to as the ternary Golay code.[citation needed]".
- Ternary_Golay_code label "Ternary Golay code".
- Ternary_Golay_code sameAs m.08pfdf.
- Ternary_Golay_code sameAs Q7702927.
- Ternary_Golay_code sameAs Q7702927.
- Ternary_Golay_code sameAs Ternary_Golay_code.
- Ternary_Golay_code wasDerivedFrom Ternary_Golay_code?oldid=551992566.
- Ternary_Golay_code isPrimaryTopicOf Ternary_Golay_code.