Keywords:-

Keywords: Cayley, Grup, Semigroup, Monoid, Homomorphism.

Article Content:-

Abstract

Cayley's theorem discusses the embedding operations between algebraic structures which are carried out by showing that there is an injective homomorphism between these algebraic structures. Each of algebraic structure has different character, so the aim of this article is to discuss how to construct Cayley's Theorem on Groups, semigroups and monoids. 

 

References:-

References

Baixiang Cheng. Homomorphism, Isomorphism and Their Applications in Group Theory, Highlights in Science, Engineering and Technology 2023: 47:71- 74.doi:10.54097/hset.v47i.8167.

Bijan Davvaz. A First Course in Group Theory. Singapore : Springer, 2021:247-281.

Cain, Alan J. Nine Chapter on the Semigroup Art. Parto&Lisbon: . the Creative Commons Attribution–Non- Commercial–NoDerivs 4.0 International Licence, 2019:1- 35.

Charles C. A . . New York:Book of Abstract Algebra. Dover Publications Inc. , 1932:2132-138.

Clifford, A.H. & Preston G.B, The Algebra Theory of Semigroup. Island: The American Mathematical Society 1977:98-120.

D.S. Malik, John M. Morderson, M.K. Sen. Fundamental of Abtract Algebra. New York:The McGraw-Hill Companies,Inc, 1997: 140-164.

Edmond W.H. Lee. A minimal pseudo-complex monoid. Archiv der Mathematik 2023: 120: 15–25. doi:10.1007/s00013-022-01797-z.

Fiala, N.C. Semigroup, monoid and group models of groupoid identities. Quasigroups and Related Systems 2008: 16:25–29. Link: https://edmondlee.prof/articles/2023_pseudo- complex.pdf

Harju & Tero. Lecture Note on Semigroup. Finland : University of Turku FIN-20014 Turku.1996:11-16.

Howie, J.M. Fundamentals of Semigroup Theory. London : Oxford University Press 1996: 1-32.

I.N Heirstein. Topics n Algebra. New York: John Wiley and Sons Inc. 1975 : 54-65.

John B. Fraleigh. A First Course in Abstract Algebra. London: Pearson Education Inc. 2003:125-167.

Linda Gilbert , Jimmie Gilbert. Elements of Modern Algebra. USA : Brook/Cole 2009:205-208.

Mario Petrich. Cayley Theorems for Semigroup. Postdam: University of Potsdam 2018: https://www.researchgate.net/publication/328163 392_The_Cayley_type_theorem_for_semigroups

Michel Brion, On Algebraic Semigroups and Monoids, Institut Fourier,Universit´ ede Grenoble, France, 2021.

N. Ghadbane. The Inverse Monoid Associated To A Group And The Semidirect Product Of Groups. Journal of Algebra and Related Topics 2019: 7: 25-34. doi: :10.22124/JART.2019.11348.1120

Suryoto, Titi Udjiani. Characterization of Reguler Semigroup and Some Related Algebraic Structure. AIP Conference Proceedings 2023: , 2723,020021-1-020021-6. Doi:10.1063/5.0140674

Downloads

Citation Tools

How to Cite
SRRM, T., & ., S. (2025). Analysis of Conctruction Cayley’s Theorem on Groups, Semigroups Dan Monoids. International Journal Of Mathematics And Computer Research, 13(7), 5365-5367. https://doi.org/10.47191/ijmcr/v13i7.02