A NEW EXAMPLE FOR MINIMALITY OF MONOIDS
DOI10.1142/S1793557110000416zbMath1211.20047OpenAlexW2152441185MaRDI QIDQ3067243
Eylem Güzel Karpuz, Fırat Ateş, Ahmet Sinan Cevik, Ayşe Dilek Güngör
Publication date: 20 January 2011
Published in: Asian-European Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793557110000416
split extensionsefficiencyminimalitynumbers of generatorsrewriting systemsefficient presentationsfinite presentationsmonogenic monoids
Free semigroups, generators and relations, word problems (20M05) Grammars and rewriting systems (68Q42) Mappings of semigroups (20M15) Connections of semigroups with homological algebra and category theory (20M50)
Cites Work
- Word problems and a homological finiteness condition for monoids
- Finite derivation type for semi-direct products of monoids
- Finite derivation type implies the homological finiteness condition \(FP_ 3\)
- Minimal but inefficient presentations of the semi-direct products of some monoids.
- THE p-COCKCROFT PROPERTY OF THE SEMI-DIRECT PRODUCTS OF MONOIDS
- Low dimensional homotopy for monoids II: groups
- LOW-DIMENSIONAL HOMOTOPY THEORY FOR MONOIDS
- On the Efficiency of the Direct Products of Monogenic Monoids
- Minimal But Inefficient Presentations for Self Semidirect Products of the Free Abelian Monoid on Two Generators
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