On Sheffer symmetric functions in three-valued logic (Q1113890)

scientific article; zbMATH DE number 4081510

Language	Label	Description	Also known as
English	On Sheffer symmetric functions in three-valued logic	scientific article; zbMATH DE number 4081510

Statements

instance of

scholarly article

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title

On Sheffer symmetric functions in three-valued logic (English)

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published in

Discrete Applied Mathematics

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publication date

1989

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review text

A Sheffer function is a function which can produce by superposition all functions of a considered set. In this paper we give an exact formula for the number of n-ary Sheffer symmetric functions in three-valued logic.

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zbMATH Keywords

Sheffer function

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number of n-ary Sheffer symmetric functions in three- valued logic

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Algebraic Properties of Symmetric and Partially Symmetric Boolean Functions

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Q5572304

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The determination of all Sheffer functions in 3-valued logic, using a logical computer

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Algebraic logic. Transl. from the Russian by Robert H. Silverman

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On η-valued functionally complete truth functions

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Q3268312

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Q4044549

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On Multivalued Symmetric Functions

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Three‐Valued Commutative Pseudo‐Sheffer Functions

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The Sheffer functions of 3-valued logic

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Algebraic Properties of N-Valued Propositional Calculi

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Q5685970

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Generation of any N-Valued Logic by One Binary Operation

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Complete Connectives for the 3-Valued Propositional Calculus

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full work available at URL

https://doi.org/10.1016/0166-218x(88)90099-6

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Identifiers

zbMATH Open document ID

0662.03009

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DOI

10.1016/0166-218X(88)90099-6

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Mathematics Subject Classification ID

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Sitelinks

Mathematics(1 entry)

mardi Publication:1113890