An upper bound for the size of the ideal class monoid

Abstract

The ideal class monoid for an order R in a finite field extension E/F of a number field, denoted by Cl(R), is a fundamental object to study in number theory which has useful applications in algebraic geometry and topology. In this paper, we describe an upper bound for \#Cl(R), in terms of the class number of E and (local) orbital integrals for gln. We also describe an upper bound for the class number of E in terms of the Minkowski bound. When [E:F]≤ 3 or when R is a Bass order, we refine our upper bound, using a known formula for local orbital integrals in the authors' previous work. In particular, if R=Z[x]/(x3-mx2+(m-1)x-1) with m∈ Z which arises in a study of Cappell-Shaneson homotopy 4-spheres in topology, then we further refine our upper bound in terms of the discriminants of R and E, which is 235 R12· E32, when E>3075.