Arithmetical invariants of local quaternion orders

Abstract

Let D be a DVR, let K be its quotient field, and let R be a D-order in a quaternion algebra A over K. The elasticity of R is (R) = \\, k/l : u1·s uk = v1 ·s vl with ui, vj atoms of R and k, l 1 \,\ and is one of the basic arithmetical invariants that is studied in factorization theory. We characterize finiteness of (R) and show that the set of distances (R) and all catenary degrees c d(R) are finite. In the setting of noncommutative orders in central simple algebras, such results have only been understood for hereditary orders and for a few individual examples.