THE TOPOLOGICAL SUBGROUP'S REFLECTIVE CATEGORY

Authors

  • Amit Tuteja Guru Kashi University, Talwandi Sabo Author
  • Madhuchanda Rakshit Guru Kashi University, Talwandi Sabo Author

DOI:

https://doi.org/10.61841/fh20g976

Keywords:

Endomorphism, monoids, algebra, structure, semilattice, etc

Abstract

Endomorphism monoids have long piqued the curiosity of researchers in both universal algebra and specific classes of algebraic structures. Endomorphism monoids have long piqued the curiosity of researchers in both universal algebra and specific classes of algebraic structures. The collection of endomorphisms for any algebra is closed under composition and forms a monoid (that is, a semigroup with identity). The endomorphism monoid is a fascinating structure that can be obtained from a given algebra. The structure and features of the endomorphism monoid of a strong semilattice of left simple semigroups are investigated in this research. In such a semigroup, the defining homomorphisms are primarily constant or bijective.

 

 

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References

1. Bin Zhaoa , Changchun Xiaa , Kaiyun Wang(2017)” Topological Semigroups and

their Prequantale Models” Published by Faculty of Sciences and Mathematics,

University of Nis, Serbia pp.6205-6210

2. M. Husek and J. van Mill, eds., Elsevier, Amsterdam, (2002), “Recent Progress in

General Topology,”published by the National Science Foundation (USA) via grant

DMS-0070593,pp 227-251

3. Pannawit Khamrot and Manoj Siripitukdet(2017) “Some Types of Subsemigroups

Characterized in Terms of Inequalities of Generalized Bipolar Fuzzy

Subsemigroups” ,Mathematics 2017, 5, 71; doi:10.3390/math5040071,pp.1-14I

4. Isabel A. Xarez And Joao J. Xarez (2013)” Galois Theories of Commutative

Semigroups Via Semilattices” Vol. 28, No. 33, 2013, pp. 1153–1169.

5. Matthew Jacques(2017)” Composition sequences and semigroups of M¨obius

transformations”pp 19-35

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Published

30.06.2021

Issue

Vol. 25 No. 3 (2021): 25 (3) 2021

Section

Articles

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How to Cite

Tuteja, A., & Rakshit, M. (2021). THE TOPOLOGICAL SUBGROUP’S REFLECTIVE CATEGORY. International Journal of Psychosocial Rehabilitation, 25(3), 1368-1375. https://doi.org/10.61841/fh20g976