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Deformations of Lie brackets: cohomological aspects

Marius Crainic, Ieke Moerdijk (2008)

Journal of the European Mathematical Society

We introduce a new cohomology for Lie algebroids, and prove that it provides a differential graded Lie algebra which “controls” deformations of the structure bracket of the algebroid.

Dependent elements of derivations on semiprime rings.

Ali, Faisal, Chaudhry, Muhammad Anwar (2009)

International Journal of Mathematics and Mathematical Sciences

Derivation-like mappings for normal elements in prime rings with involution.

Swain, Gordon A. (2006)

Mathematica Pannonica

Derivations and multilinear polynomials

O. M. Di Vincenzo (1989)

Rendiconti del Seminario Matematico della Università di Padova

Derivations in rings with involution

Silvana Mauceri (1990)

Rendiconti del Seminario Matematico della Università di Padova

Derivations in some finite endomorphism semirings

Ivan Dimitrov Trendafilov (2012)

Discussiones Mathematicae - General Algebra and Applications

The goal of this paper is to provide some basic structure information on derivations in finite semirings.

Derivations of higher order in semiprime rings.

Luh, Jiang, Ye, Youpei (1998)

International Journal of Mathematics and Mathematical Sciences

Derivations of Skew Polynomial Rings

Naoki Hamaguchi, Atsushi Nakajima (2002)

Publications de l'Institut Mathématique

Derivations of the algebra $U_{q}^{+} (B_{2})$ . (Dérivations de l'algèbre $U_{q}^{+} (B_{2})$ .)

Ben Yakoub, L., Louly, A. (2009)

Beiträge zur Algebra und Geometrie

Derivations on noncommutative Banach algebras

Tsiu-Kwen Lee (2005)

Studia Mathematica

We discuss range inclusion results for derivations on noncommutative Banach algebras from the point of view of ring theory.

Derivations satisfying polynomial identities

Andrzej Nowicki (1989)

Colloquium Mathematicae

Derivations with Engel conditions in prime and semiprime rings

Shuliang Huang (2011)

Czechoslovak Mathematical Journal

Let $R$ be a prime ring, $I$ a nonzero ideal of $R$ , $d$ a derivation of $R$ and $m, n$ fixed positive integers. (i) If ${(d [x, y])}^{m} = {[x, y]}_{n}$ for all $x, y \in I$ , then $R$ is commutative. (ii) If $Char R \neq 2$ and ${[d (x), d (y)]}_{m} = {[x, y]}^{n}$ for all $x, y \in I$ , then $R$ is commutative. Moreover, we also examine the case when $R$ is a semiprime ring.

Derivations with power central values on Lie ideals in prime rings

Basudeb Dhara, Rajendra K. Sharma (2008)

Czechoslovak Mathematical Journal

Let $R$ be a prime ring of char $R \neq 2$ with a nonzero derivation $d$ and let $U$ be its noncentral Lie ideal. If for some fixed integers $n_{1} \geq 0, n_{2} \geq 0, n_{3} \geq 0$ , ${(u^{n_{1}} [d (u), u] u^{n_{2}})}^{n_{3}} \in Z (R)$ for all $u \in U$ , then $R$ satisfies $S_{4}$ , the standard identity in four variables.

Derivazioni in anelli primi

Vincenzo De Filippis (2000)

Bollettino dell'Unione Matematica Italiana

Differentially trivial left Noetherian rings

O. D. Artemovych (1999)

Commentationes Mathematicae Universitatis Carolinae

We characterize left Noetherian rings which have only trivial derivations.

Differentially trivial Noetherian semiperfect rings.

Artemovych, O.D. (2002)

Mathematica Pannonica

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