Structure and Spectral Theory of Non-Commutative and $n$-ary $\Gamma$-Semirings

Chandrasekhar Gokavarapu (1,2); D. Madhusudhana Rao (2,3) ((1) Department of Mathematics; Government College (Autonomous); Rajahmundry; Andhra Pradesh; India; (2) Department of Mathematics; Acharya Nagarjuna University; Guntur; Andhra Pradesh; India; (3) Department of Mathematics; Government College for Women (Autonomous); Guntur; Andhra Pradesh; India)

arXiv:2511.14125·math.RA·November 19, 2025

Structure and Spectral Theory of Non-Commutative and $n$-ary $\Gamma$-Semirings

Chandrasekhar Gokavarapu (1,2), D. Madhusudhana Rao (2,3) ((1) Department of Mathematics, Government College (Autonomous), Rajahmundry, Andhra Pradesh, India, (2) Department of Mathematics, Acharya Nagarjuna University, Guntur, Andhra Pradesh, India

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TL;DR

This paper develops the structural and spectral theory of non-commutative and n-ary Gamma semirings, extending classical frameworks and establishing new radical and spectral concepts for these algebraic structures.

Contribution

It introduces new ideal and radical concepts for non-commutative and n-ary Gamma semirings, unifying spectral theory across different algebraic contexts.

Findings

01

Defined left, right, and two-sided ideals in noncommutative Gamma semirings.

02

Established quotient characterizations of prime and semiprime ideals.

03

Formulated a noncommutative Wedderburn-Artin-type decomposition.

Abstract

This paper develops the structural and spectral foundations of noncommutative and n-ary Gamma semirings, extending the commutative ternary framework established in earlier studies. We introduce left, right, and two-sided ideals in the noncommutative setting, derive quotient characterizations of prime and semiprime ideals, and construct corresponding Gamma-Jacobson radicals. For general n-ary operations, we define (n,m)-type ideals and establish diagonal criteria for n-ary primeness and semiprimeness. A unified radical theory and a Zariski-type spectral topology are then formulated, connecting primitive ideals with simple module representations. The results culminate in a noncommutative Wedderburn-Artin-type decomposition, revealing a triadic spectral geometry that unifies commutative, noncommutative, and higher-arity cases

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Taxonomy

TopicsRings, Modules, and Algebras · Advanced Topics in Algebra · Commutative Algebra and Its Applications