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Let $𝒜$ be a noncommutative prime ring equipped with an involution ‘ $*$ ’, and let $𝒬_{m s} (𝒜)$ be the maximal symmetric ring of quotients of $𝒜$ . Consider the additive maps $ℋ$ and $𝒯 : 𝒜 \to 𝒬_{m s} (𝒜)$ . We prove the following under some inevitable torsion restrictions. (a) If $m$ and $n$ are fixed positive integers such that $(m + n) 𝒯 (a^{2}) = m 𝒯 (a) a^{*} + n a 𝒯 (a)$ for all $a \in 𝒜$ and $(m + n) ℋ (a^{2}) = m ℋ (a) a^{*} + n a 𝒯 (a)$ for all $a \in 𝒜$ , then $ℋ = 0$ . (b) If $𝒯 (a b a) = a 𝒯 (b) a^{*}$ for all $a, b \in 𝒜$ , then $𝒯 = 0$ . Furthermore, we characterize Jordan left $τ$ -centralizers in semiprime rings admitting an anti-automorphism $τ$ . As applications, we find the structure of...

On the Classification of Nilpotent Groups.

Robert L. Kruse, David P. Price (1970)

Mathematische Zeitschrift

On the compactness of minimal spectrum

Giuliano Artico, Umberto Marconi (1976)

Rendiconti del Seminario Matematico della Università di Padova

On the degree of nilpotency of the radical of relatively free algebras.

Domokos, M., Popov, A. (1997)

Mathematica Pannonica

On the generalized hypercentralizer of a Lie ideal in a prime ring

V. De Filippis, O. M. Di Vincenzo (1998)

Rendiconti del Seminario Matematico della Università di Padova

On the Isomorphism Problem for Integral Group-Rings of Circle-Groups.

Frank Röhl (1982)

Mathematische Zeitschrift

On the Jacobson radical and unit groups of group álgebras.

Meena Sahai (1998)

Publicacions Matemàtiques

In this paper, we study the situation as to when the unit group U(KG) of a group algebra KG equals K*G(1 + J(KG)), where K is a field of characteristic p > 0 and G is a finite group.

On the Jacobson radical of graded rings.

Kelarev, A.V. (1992)

Commentationes Mathematicae Universitatis Carolinae

On the Jacobson radical of graded rings

Andrei V. Kelarev (1992)

Commentationes Mathematicae Universitatis Carolinae

All commutative semigroups $S$ are described such that the Jacobson radical is homogeneous in each ring graded by $S$ .

On the Jacobson radical of strongly group graded rings

Andrei V. Kelarev (1994)

Commentationes Mathematicae Universitatis Carolinae

For any non-torsion group $G$ with identity $e$ , we construct a strongly $G$ -graded ring $R$ such that the Jacobson radical $J (R_{e})$ is locally nilpotent, but $J (R)$ is not locally nilpotent. This answers a question posed by Puczyłowski.

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Displaying 221 – 240 of 510

On strongly prime semiring.

On structure of certain periodic rings and near-rings.

On The Brown-McCoy Radical Of Group Rings

On the Brown-McCoy radical of group rings.

On the characterization of certain additive maps in prime $*$ -rings

On the Classification of Nilpotent Groups.

On the compactness of minimal spectrum

On the degree of nilpotency of the radical of relatively free algebras.

On the generalized hypercentralizer of a Lie ideal in a prime ring

On the Isomorphism Problem for Integral Group-Rings of Circle-Groups.

On the Jacobson radical and unit groups of group álgebras.

On the Jacobson radical of graded rings.

On the Jacobson radical of graded rings

On the Jacobson radical of strongly group graded rings

On the nilpotency of the Jacobson radical of semigroup rings.

On the radical theory of involution algebras

On the radical theory of semirings.

On the radicals of near-rings with defect of distributivity.

On the Radicals of Structural Matrix Rings.

On the Structure of Certain PP-Rings.

Currently displaying 221 – 240 of 510