Abstract
Let R be a Dedekind ring, K its quotient field, and L = K(alpha) a finite field extension of K defined by a monic irreducible polynomial f(x) epsilon R[x]. We give an easy version of Dedekind's criterion which computationally improves those versions known in the literature. We further use this result to give a sufficient condition for the integral closedness of R[alpha] when f(x) = x(n) - a. In case R is the ring of integers of a number field, we give yet sufficient and necessary conditions for this to hold, generalizing and improving in both cases some known results in this direction. Some highlighting examples are also given.