Let $R\left[x\right]$ be the polynomial ring over a ring $R$ with unity. A polynomial $f\left(x\right)\in R\left[x\right]$ is referred to as a left annihilating content polynomial (left ACP) if there exist an element $r\in R$ and a polynomial $g\left(x\right)\in R\left[x\right]$ such that $f\left(x\right)=rg\left(x\right)$ and $g\left(x\right)$ is not a right zero-divisor polynomial in $R\left[x\right]$. A ring $R$ is referred to as left EM if each polynomial $f\left(x\right)\in R\left[x\right]$ is a left ACP. We observe the structure of left EM rings with various properties, and study the relationships between the one-sided EM condition and other standard ring theoretic conditions. Moreover,...

Let M be a 2 and 3-torsion free prime Γ-ring, d a nonzero derivation on M and U a nonzero Lie ideal of M. In this paper it is proved that U is a central Lie ideal of M if d satisfies one of the following (i) d(U)⊂ Z, (ii) d(U)⊂ U and d²(U)=0, (iii) d(U)⊂ U, d²(U)⊂ Z.