Semi-homomorphisms of near-rings.
Semiprime ideals of skew polynomial rings.
Semirings whose additive endomorphisms are multiplicative
A ring or an idempotent semiring is associative provided that additive endomorphisms are multiplicative.
Semisimple Algebras and a Cancellation Law.
Separable subalgebras of a class of Azumaya algebras.
Simple Skew Polynomial Rings
Skeletons, bodies and generalized -algebras
Skew group rings which are Galois.
Slender modules, endo-slender abelian groups and large cardinals
Smash products for -sets, Clifford theory and duality theorems.
Some characterizations of regular modules.
Let M be a left module over a ring R. M is called a Zelmanowitz-regular module if for each x ∈ M there exists a homomorphism F: M → R such that f(x) = x. Let Q be a left R-module and h: Q → M a homomorphism. We call h locally split if for every x ∈ M there exists a homomorphism g: M → Q such that h(g(x)) = x. M is called locally projective if every epimorphism onto M is locally split. We prove that the following conditions are equivalent:(1) M is Zelmanowitz-regular.(2) every homomorphism into M...
Some conditions on fixed rings.
Some correspondences for Galois skew group rings.
Some Primitive Differential Operator Rings.
Stiff derivations of commutative rings
Strong commutativity preserving maps on Lie ideals of semiprime rings.
Strong stably finite rings and some extensions.
Sums of Squares in Division Algebras.
Sur quelques classes d'anneaux liées au lemme de Fitting
Symmetric bi-derivations on prime and semi-prime rings.