On \((m, n)\)-absorbing prime ideals and \((m, n)\)-absorbing ideals of commutative rings (Q6188420)

Let \(R\) be a commutative ring, \(m>n\) positive integres and \(I\) a proper ideal of \(R.\) \(I\) is called an \((m,n)\)-absorbing prime ideal if whenever \(a_1\ldots a_m\in I,\) where \(a_1,\ldots,a_m\in R\) are non-units, then \(a_1\ldots a_n\in I\) or \(a_{n+1}\ldots a_m\in I.\)The author are studying the \((m,n)\)-absorbing prime ideals, as well as its generalizations \((m,n)\)-absorbing ideals and \(AB-(m,n)\)-absorbing ideals. They give properties of these classes of ideals and they study the behaviour to localizations, direct products or trivial ring extensions. Also, connections between the three classes of ideals are studied. A lot of nice examples are illustrating the theory.