Topics in higher ramification theory I: ramification ideals

Abstract

We introduce and study the notion of ramification ideals in higher ramification theory. After general results on their computation for finite extensions, we discuss their connection with the possibly nontrivial defect of the extensions. We compute them for Artin-Schreier extensions and Kummer extensions of prime degree equal to the residue characteristic, which may or may not have nontrivial defect. We present an example that shows that nontrivial defect in an extension of degree p2, p a prime, may not imply the existence of a nonprincipal ramification ideal.