TY - JOUR
T1 - Fractal structure of nearrings based on permutation identities
AU - B. J, Chaithra
AU - Babushri Srinivas, Kedukodi
AU - Syam Prasad, Kuncham
AU - Koppula, Kavitha
N1 - Publisher Copyright:
© 2025 Taylor & Francis Group, LLC.
PY - 2025
Y1 - 2025
N2 - For (Formula presented.) and for a permutation σ on k letters, the identity of the form (Formula presented.) is called a permutation identity. Fractals are self-similar structures exhibiting self-similarity at all scales. Algebraic structures that exhibit fractal-like nature are of great interest. Using the notion of permutation identities, we obtain self-similar infinite substructures of a nearring. We extend the notion of ideal of a nearring by defining product fractal ideal of a nearring. We obtain the quotient structure induced by fractal ideals and derive fractal isomorphism theorems for nearrings.
AB - For (Formula presented.) and for a permutation σ on k letters, the identity of the form (Formula presented.) is called a permutation identity. Fractals are self-similar structures exhibiting self-similarity at all scales. Algebraic structures that exhibit fractal-like nature are of great interest. Using the notion of permutation identities, we obtain self-similar infinite substructures of a nearring. We extend the notion of ideal of a nearring by defining product fractal ideal of a nearring. We obtain the quotient structure induced by fractal ideals and derive fractal isomorphism theorems for nearrings.
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U2 - 10.1080/00927872.2025.2451083
DO - 10.1080/00927872.2025.2451083
M3 - Article
AN - SCOPUS:85216488621
SN - 0092-7872
JO - Communications in Algebra
JF - Communications in Algebra
ER -