The notions of ordering filter and left mapping in a GE-algebra are introduced, and their properties are investigated. Relations between ordering filters and GE-filters are established. Conditions for an ordering filter to be a GE-filter, and vice versa, are provided. The conditions under which a left mapping becomes injective or an identity are explored. The conditions under which the GE-kernel of a self-mapping will be a GE-filter are provided. It is confirmed that the sets of all left mappings form a semigroup, and that the sets of all idempotent left mappings form a subsemigroup. The conditions under which the sets of all left mappings can be closed with respect to a binary operation are investigated.
Primary Language | English |
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Subjects | Algebra and Number Theory, Mathematical Logic, Set Theory, Lattices and Universal Algebra |
Journal Section | Research Articles |
Authors | |
Publication Date | |
Submission Date | May 29, 2024 |
Acceptance Date | August 26, 2024 |
Published in Issue | Year 2024 Volume: 73 Issue: 4 |
Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistics.
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