On the logarithmic probability that a random integral ideal is \(\mathcal A\)-free (Q1710478)

Let $\mathcal{A}=\{\mathfrak{a}_1,\mathfrak{a}_1,\dots\}$ be a fixed set of non-zero integral ideals in the ring of integers of a fixed algebraic number field $K$. Let $\mathcal{M}_{\mathcal{A}}=\{\mathcal{b}\neq 0 : \exists_i \mathcal{b}\subset \mathcal{a}_i\}$ and $\mathcal{V}_{\mathcal{A}}=\{\mathcal{b} : \forall_i \mathcal{b}\not\subset \mathcal{a}_i\}$. The author extends the results of \textit{H. Davenport} and \textit{P. Erdős} [J. Indian Math. Soc., New Ser. 15, 19--24 (1951; Zbl 0043.04902)] for sequences of integers to sequences of integral ideals in $K$. More precisely, he proves formulas for asymptotic and logarithmic densities of sets $\mathcal{M}_{\mathcal{A}}$ and $\mathcal{V}_{\mathcal{A}}$. It should be noted that most auxiliary results proved in the paper are known in a more general setting of arithmetic semigroups. For the entire collection see [Zbl 1397.37007].