Enumeration of subrings and subring identities of strongly unital commutative finite rings
DOI :
https://doi.org/10.51867/asarev.3.1.15Mots-clés :
Finite Commutative Rings, Ring Enumeration, Square-Free Integers, Strongly Unital Finite RingsRésumé
In this paper, we derive explicit formulas for the number of subrings of a given strongly unital ring and for the identities of those subrings. From the classification results, every finite commutative strongly unital ring R ≅ ∏ᵢ₌₁ᵏ ℤₚᵢ, where k ≥ 2 and p₁, …, pₖ are distinct primes. Equivalently, by the Chinese Remainder Theorem, R ≅ ℤₙ, where n = p₁p₂···pₖ is square-free and composite. This paper provides closed-form formulas for the number of subrings, describes the subrings explicitly, identifies the identity element of each subring, and discusses their combinatorial and algorithmic aspects.
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© Daisy Ingado Binayo, Michael Onyango Ojiema, Maurice Owino Oduor (Author) 2026

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