Indices of inseparability and refined ramification breaks

Abstract

Let K be a finite extension of Qp and let L/K be a totally ramified (Z/pZ)2-extension which has a single ramification break b. Byott and Elder defined a "refined ramification break" b* for L/K. In this paper we prove that if p>2 and the index of inseparability i1 of L/K is not equal to p2b-pb then b*=i1-p2b+pb+b.