Optimal spinor selectivity for quaternion Bass orders

Abstract

Let A be a quaternion algebra over a number field F, and O be an OF-order of full rank in A. Let K be a quadratic field extension of F that embeds into A, and B be an OF-order in K. Suppose that O is a Bass order that is well-behaved at all the dyadic primes of F. We provide a necessary and sufficient condition for B to be optimally spinor selective for the genus of O. This partially generalizes previous results on optimal (spinor) selectivity by C. Maclachlan [Optimal embeddings in quaternion algebras. J. Number Theory, 128(10):2852-2860, 2008] for Eichler orders of square-free levels, and independently by M. Arenas et al. [On optimal embeddings and trees. J. Number Theory, 193:91-117, 2018] and by J. Voight [Chapter 31, Quaternion algebras, volume 288 of Graduate Texts in Mathematics. Springer-Verlag, 2021] for Eichler orders of arbitrary levels.