The spinor type number formula for totally definite quaternion orders

Abstract

Let D be a totally definite quaternion algebra over a totally real number field F, and O be an OF-order (of full rank) in D. The type number t(O) is an important arithmetic invariant of O that counts the number of isomorphism classes of orders belonging to the same genus as O (i.e. locally isomorphic to O at every finite place p of F). The type number formula has been studied by Eichler, Peters, Pizer, Vigneras, K\"orner and many others. As the genus of O further divides into spinor genera, one naturally seeks a finer type number formula for the number of isomorphism classes of orders belonging to the same spinor genus of O. The main goal of this paper is to provide such a refinement for a large class of quaternion OF-orders O that includes all Eichler orders. This enables us to prove that t(O) is divisible by the order of a quotient group WSG(O) of the Gauss genus group Cl+(OF)/Cl+(OF)2 naturally attached to O. Similarly, we show that the trace of the n-Brandt matrix B(O, n) is divisible by the class number h(F) for any nonzero integral OF-ideal n. In particular, the class number h(O)=Tr(B(O, OF)) is always divisible by h(F) for such quaternion orders. This generalizes the divisibility result of h(O) proved in a different way by Chia-Fu Yu and the second named author [Indiana Univ. Math. J., Vol. 70, No. 2 (2021)] in the case when O is a maximal OF-order in a totally definite quaternion algebra unramified at all the finite places.