Conţinutul numărului revistei |
Articolul precedent |
Articolul urmator |
820 6 |
Ultima descărcare din IBN: 2022-06-07 20:00 |
SM ISO690:2012 FIALA, NickC., AGRE, Keith. Shortest single axioms with neutral element
for groups of exponent 2 and 3. In: Quasigroups and Related Systems, 2013, vol. 21, nr. 1(29), pp. 69-82. ISSN 1561-2848. |
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Quasigroups and Related Systems | ||||||
Volumul 21, Numărul 1(29) / 2013 / ISSN 1561-2848 | ||||||
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Pag. 69-82 | ||||||
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In this note, we study identities in product and a constant e only that are valid in all groups of exponent 2 (3) with neutral elemente and that imply that a groupoid satisfying one of them is a group of exponent 2 (3) with neutral element e. Such an identity will be called a single axiom with neutral element for groups of exponent 2 (3). We utilize the automated reasoning
software Prover9 and Mace4 to attempt to nd all shortest single axioms with neutral element for groups of exponent 2 (3). Beginning with a list of 1323 (1716) candidate identities that contains all shortest possible single axioms with neutral element for groups of exponent 2 (3), we nd 173 (148) single axioms with neutral element for groups of exponent (2) 3 and eliminate all but 5 (119) of the remaining identities as not being single axioms with neutral element for groups of
exponent 3. We also prove that a nite model of any of these 5 (119) identities must be a group of exponent 2 (3) with neutral elemente |
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Cuvinte-cheie Group, neutral element, exponent, single axiom, automated reasoning |
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Dublin Core Export
<?xml version='1.0' encoding='utf-8'?> <oai_dc:dc xmlns:dc='http://purl.org/dc/elements/1.1/' xmlns:oai_dc='http://www.openarchives.org/OAI/2.0/oai_dc/' xmlns:xsi='http://www.w3.org/2001/XMLSchema-instance' xsi:schemaLocation='http://www.openarchives.org/OAI/2.0/oai_dc/ http://www.openarchives.org/OAI/2.0/oai_dc.xsd'> <dc:creator>Fiala, N.</dc:creator> <dc:creator>Agre, K.M.</dc:creator> <dc:date>2013-02-01</dc:date> <dc:description xml:lang='en'>In this note, we study identities in product and a constant e only that are valid in all groups of exponent 2 (3) with neutral elemente and that imply that a groupoid satisfying one of them is a group of exponent 2 (3) with neutral element e. Such an identity will be called a single axiom with neutral element for groups of exponent 2 (3). We utilize the automated reasoning software Prover9 and Mace4 to attempt to nd all shortest single axioms with neutral element for groups of exponent 2 (3). Beginning with a list of 1323 (1716) candidate identities that contains all shortest possible single axioms with neutral element for groups of exponent 2 (3), we nd 173 (148) single axioms with neutral element for groups of exponent (2) 3 and eliminate all but 5 (119) of the remaining identities as not being single axioms with neutral element for groups of exponent 3. We also prove that a nite model of any of these 5 (119) identities must be a group of exponent 2 (3) with neutral elemente</dc:description> <dc:source>Quasigroups and Related Systems 29 (1) 69-82</dc:source> <dc:subject>Group</dc:subject> <dc:subject>neutral element</dc:subject> <dc:subject>exponent</dc:subject> <dc:subject>single axiom</dc:subject> <dc:subject>automated reasoning</dc:subject> <dc:title>Shortest single axioms with neutral element for groups of exponent 2 and 3</dc:title> <dc:type>info:eu-repo/semantics/article</dc:type> </oai_dc:dc>