On the least prime ideal and Siegel zeros (Q2833091)

Let \(K\) be a number field, \({\mathbf q}\) be an integral ideal and \(\mathrm{Cl}({\mathbf q})\) be the associate narrow ray class group. For given class \(C \in \mathrm{Cl}({\mathbf q})\) it is known that there are infinitely many prime ideals \({\mathbf p} \in C\); therefore it is natural to ask ``what is the least norm of a prime ideal \({\mathbf p} \in C\)?''.NEWLINENEWLINESuppose \(\mathrm{Cl}({\mathbf q})\) possesses a real exceptional character \(\Psi\), possibly principal, with a Seigel zero \(\beta\). For \(C \in \mathrm{Cl}({\mathbf q})\) satisfying \(\Psi(C) = 1\), and under the generalized Riemann hypothesis, the author establishes an effective \(K\)-uniform Linnik-type bound with explicit exponents for the least norm of prime ideal \({\mathbf p} \in C\). A special case of this result is a bound for the least rational prime represented by certain binary quadratic forms.