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Interior GE-Algebras

Author

Listed:
  • Jeong-Gon Lee
  • Ravikumar Bandaru
  • Kul Hur
  • Young Bae Jun
  • Hee S. Kim

Abstract

The concepts of (commutative, transitive, left exchangeable, belligerent, antisymmetric) interior GE-algebras and bordered interior GE-algebras are introduced, and their relations and properties are investigated. Many examples are given to support these concepts. A semigroup is formed using the set of interior GE-algebras. An example is given that the set of interior GE-algebras is not a GE-algebra. It is clear that if X is a transitive (resp., commutative, belligerent, and left exchangeable) GE-algebra, then the interior GE-algebra X,f is transitive (resp., commutative, belligerent, and left exchangeable), but examples are given to show that the converse is not true in general. An interior GE-algebra is constructed using a bordered interior GE-algebra with certain conditions, and an example is given to explain this.

Suggested Citation

  • Jeong-Gon Lee & Ravikumar Bandaru & Kul Hur & Young Bae Jun & Hee S. Kim, 2021. "Interior GE-Algebras," Journal of Mathematics, Hindawi, vol. 2021, pages 1-10, February.
  • Handle: RePEc:hin:jjmath:6646091
    DOI: 10.1155/2021/6646091
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