Results 91 to 100 of about 206 (186)
Topological Noetherianity of polynomial functors II: base rings with Noetherian spectrum. [PDF]
Math Ann, 2023 Bik A, Danelon A, Draisma J.
europepmc +1 more source
Low-rank parity-check codes over Galois rings. [PDF]
Des Codes Cryptogr, 2021 Renner J, Neri A, Puchinger S.
europepmc +1 more source
A Novel Algebraic Structure of (α,β)-Complex Fuzzy Subgroups. [PDF]
Entropy (Basel), 2021 Alolaiyan H +4 more
europepmc +1 more source
Note on strongly Lie nilpotent rings.
, 2000 Some results on strongly Lie nilpotent rings are given in the paper. Among them there is an analogue of P. Hall's theorem on nilpotent groups. We quote it: Let \(R\) be a ring, let \(I\) be an ideal of \(R\) such that its strong center \(F(I)\) is an ideal of \(R\) and let \(M\) be the largest ideal of \(R\) contained in the Lie square of \(I\). If \(I\
CATINO, Francesco, MICCOLI M. M.
openaire +4 more sources
Ideals and their complements in commutative semirings. [PDF]
Soft comput, 2019 Chajda I, Länger H.
europepmc +1 more source
Rings in Which Every Quasi-nilpotent Element is Nilpotent
Turkish Journal of Mathematics and Computer ScienceA ring \( R \) is called a QN-ring if \( R \) satisfies the equation \( Q(R) = N(R) \). In this paper, we present some fundamental properties of the class of QN-rings. It is shown that for \( R \) being a 2-primal (nil-semicommutative) ring, \( R \) is a QN-ring if and only if \( Q(R) \) is a nil ideal; if \( R \) is a QN-ring, then \( R/J(R) \) is
openaire +2 more sources
The local motivic DT/PT correspondence. [PDF]
J Lond Math Soc, 2021 Davison B, Ricolfi AT.
europepmc +1 more source
Controlling LEF growth in some group extensions. [PDF]
J Algebr Comb (Dordr)Bradford H.
europepmc +1 more source