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Radical d'une algèbre symétrique à gauche

Jacques Helmstetter (1979)

Annales de l'institut Fourier

L’étude d’une algèbre symétrique à gauche (de dimension finie sur $C$ ) est liée à celle d’un groupe de transformations affines opérant avec trajectoire ouverte et groupe d’isotropie discret sur cette trajectoire. Son radical est défini grâce aux translations conservant cette trajectoire; l’algèbre est nilpotente si ce groupe opère de façon simplement transitive (les multiplications à droite sont alors nilpotentes). Le radical est le plus grand idéal à gauche nilpotent.

Radical of splitting ring extensions.

Paul E. Jambor (1989)

Mathematica Scandinavica

Radicals Coinciding with the Von Neumann Regular Radical on Artinian Rings.

A.D. Sands, R. Mlitz, R. Wiegandt (1998)

Monatshefte für Mathematik

Radicals induced by the total of rings.

Beidar, K.I., Wiegandt, R. (1997)

Beiträge zur Algebra und Geometrie

Radicals of Polynomial Rings in Non-commutative Indeterminates.

Edmund R. Puczylowski (1983)

Mathematische Zeitschrift

Radicals of Regular Near Rings.

Marjory J. Johnson (1975)

Monatshefte für Mathematik

Radicals of semigroup rings of commutative semigroups.

A.V. Kelarev (1994)

Semigroup forum

Radicals of semigroup rings of orthogroups.

A.G. Sokolsky (1990)

Semigroup forum

Radicals of symmetric cellular algebras

Yanbo Li (2013)

Colloquium Mathematicae

For a symmetric cellular algebra, we study properties of the dual basis of a cellular basis first. Then a nilpotent ideal is constructed. The ideal connects the radicals of cell modules with the radical of the algebra. It also yields some information on the dimensions of simple modules. As a by-product, we obtain some equivalent conditions for a finite-dimensional symmetric cellular algebra to be semisimple.

Radicals which coincide on a class of rings.

Sands, A.D. (1997)

Mathematica Pannonica

Radicals which define factorization systems

Barry J. Gardner (1991)

Commentationes Mathematicae Universitatis Carolinae

A method due to Fay and Walls for associating a factorization system with a radical is examined for associative rings. It is shown that a factorization system results if and only if the radical is strict and supernilpotent. For groups and non-associative rings, no radical defines a factorization system.

Radikale von separablen Algebren über Ringen.

Robert Wisbauer (1974)

Mathematische Zeitschrift

Rad-supplemented modules

Engin Büyükaşik, Engin Mermut, Salahattin Özdemir (2010)

Rendiconti del Seminario Matematico della Università di Padova

Range inclusion results for derivations on noncommutative Banach algebras

Volker Runde (1993)

Studia Mathematica

Let A be a Banach algebra, and let D : A → A be a (possibly unbounded) derivation. We are interested in two problems concerning the range of D: 1. When does D map into the (Jacobson) radical of A? 2. If [a,Da] = 0 for some a ∈ A, is Da necessarily quasinilpotent? We prove that derivations satisfying certain polynomial identities map into the radical. As an application, we show that if [a,[a,[a,Da]]] lies in the prime radical of A for all a ∈ A, then D maps into the radical. This generalizes a result...

Currently displaying 1 – 20 of 31