The (α, β)-ramification invariants of a number field

Abstract

Let L be a number field. For a given prime p we define integers αpL and βpL with some interesting arithmetic properties. For instance, βpL is equal to 1 whenever p does not ramify in L and αpL is divisible by p whenever p is wildly ramified in L. The aforementioned properties, although interesting, follow easily from definitions; however a more interesting application of these invariants is the fact that they completely characterize the Dedekind zeta function of L. Moreover, if the residue class mod p of αpL is not zero for all p then such residues determine the genus of the integral trace.