On Modulo AG-Groupoids

Authors

  • Aman Ullah University of Malakand
  • M. Rashad University of Malakand
  • I. Ahmad University of Malakand
  • M. Saha Govt Post Graduate College Mardan

DOI:

https://doi.org/10.24297/jam.v8i3.7265

Keywords:

AG-groupoids (mod n), AG-groups (mod n), construction, T 3-AG-groupoid, can- cellative AG-groupoid

Abstract

A groupoid G is called an AG-groupoid if it satisfies the left invertive law: (ab)c = (cb)a. An AG-group G, is an AG-groupoid with left identity e 2 G (that is, ea = a for all a 2 G) and for all a 2 G there exists 12 G such that a 1 a = 1 = e. In this article we introduce the concept of AG-groupoids (mod n) and AG-group (mod n) using Vasanthas constructions [1]. This enables us to prove that AG-groupoids (mod n) and AG-groups (mod n) exist for every integer n 3. We also give some nice characterizations of some classes of AG-groupoids in terms of AG-groupoids (mod n).

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Author Biographies

Aman Ullah, University of Malakand

Assistant Professor in Department of Mathematicsm, University of Malakand.

M. Rashad, University of Malakand

Assistant Professor in Department of Mathematics, University of Malakand, Pakistan.

I. Ahmad, University of Malakand

Assistant Professor in Department of Mathematics, University of Malakand, Pakistan.

M. Saha, Govt Post Graduate College Mardan

Department of Mathematics, Govt Post Graduate College Mardan, Pakistan.

JOURNAL OF ADVANCES IN MATHEMATICS

Published

2014-05-24

How to Cite

Ullah, A., Rashad, M., Ahmad, I., & Saha, M. (2014). On Modulo AG-Groupoids. JOURNAL OF ADVANCES IN MATHEMATICS, 8(3), 1606–1613. https://doi.org/10.24297/jam.v8i3.7265

Issue

Vol. 8 No. 3 (2014)

Section

Articles

License

Creative Commons License All articles published in Journal of Advances in Linguistics are licensed under a Creative Commons Attribution 4.0 International License.

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