The lattice of primary ideals of orders in quadratic number fields (Q2828374)

Let \(K\) be a quadratic number field with ring of integers \(D\), and \(O\) an order in \(K\) with conductor \(\mathcal F=fD\). In general, the description of ideals of \(O\) that are coprime to the conductor is well-known and not hard, but the structure of non-coprime ideals is quite complicated. The authors tackle this problem in the case when the conductor \(\mathcal F\) is a prime ideal of \(D\), and give a complete description of the lattice of \(\mathcal F\)-primary ideals of \(O\) in terms of the splitting behavior of the rational prime \(f\) in \(D\).