On the Anderson-Badawi ωR[X](I[X])=ωR(I) conjecture

Abstract

Let R be a commutative ring with an identity different from zero and n be a positive integer. Anderson and Badawi, in their paper on n-absorbing ideals, define a proper ideal I of a commutative ring R to be an n-absorbing ideal of R, if whenever x1 ·s xn+1 ∈ I for x1, …, xn+1 ∈ R, then there are n of the xi's whose product is in I and conjecture that ωR[X](I[X])=ωR(I) for any ideal I of an arbitrary ring R, where ωR(I)= \n is an n-absorbing ideal of R\. In the present paper, we use content formula techniques to prove that their conjecture is true, if one of the following conditions hold: The ring R is a Pr\"ufer domain. The ring R is a Gaussian ring such that its additive group is torsion-free. The additive group of the ring R is torsion-free and I is a radical ideal of R.