Erdős-Burgess constant in commutative rings
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Publication:2657484
DOI10.1007/s00013-020-01506-8zbMath1498.11077OpenAlexW3118645962MaRDI QIDQ2657484
Publication date: 12 March 2021
Published in: Archiv der Mathematik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00013-020-01506-8
idempotentsJacobson radicalNoetherian ringsDavenport constantzero-summultiplicative semigroups of ringsErdős-Burgess constant
Other combinatorial number theory (11B75) Commutative Noetherian rings and modules (13E05) Arithmetic theory of semigroups (20M13) Combinatorial aspects of commutative algebra (05E40)
Cites Work
- Davenport constant for commutative rings
- On the Davenport constant and on the structure of extremal zero-sum free sequences
- Zero-sum problems in finite Abelian groups: a survey
- Structure of the largest idempotent-product free sequences in semigroups
- Davenport constant for semigroups. II.
- A quantitative version of the idempotent theorem in harmonic analysis
- Additively irreducible sequences in commutative semigroups
- An upper bound for the Davenport constant of finite groups
- A combinatorial problem on finite Abelian groups. I
- Note on the Davenport constant of the multiplicative semigroup of the quotient ring 𝔽p[x 〈f(x)〉]
- A problem of G. Q. Wang on the Davenport constant of the multiplicative semigroup of quotient rings of $\mathbb {F}_2[x$]
- On a Conjecture of Littlewood and Idempotent Measures
- On Finite Semigroups and Idempotents
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