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On noncommutative bounded factorization domains and prime rings

Jason P. Bell, Ken A. Brown, Zahra Nazemian, Daniel Smertnig

2023Journal of Algebra10 citationsDOIOpen Access PDF

Abstract

A ring has bounded factorizations if every cancellative nonunit a∈R can be written as a product of atoms and there is a bound λ(a) on the lengths of such factorizations. The bounded factorization property is one of the most basic finiteness properties in the study of non-unique factorizations. Every commutative noetherian domain has bounded factorizations, but it is open whether such a result holds in the noncommutative setting. We provide sufficient conditions for a noncommutative noetherian prime ring to have bounded factorizations. Moreover, we construct a (noncommutative) finitely presented semigroup algebra that is an atomic domain but does not satisfy the ascending chain condition on principal right or left ideals (ACCP), whence it does not have bounded factorizations.

Topics & Concepts

Noncommutative geometryMathematicsBounded functionUnique factorization domainNoetherianNoncommutative ringFactorizationCommutative propertyNoncommutative algebraic geometryRing (chemistry)Discrete mathematicsPrime (order theory)Domain (mathematical analysis)Pure mathematicsAlgebra over a fieldCombinatoricsNoncommutative quantum field theoryChemistryOrganic chemistryMathematical analysisAlgorithmRings, Modules, and AlgebrasAdvanced Topics in AlgebraAlgebraic structures and combinatorial models
On noncommutative bounded factorization domains and prime rings | Litcius