Weak crossed-product orders over valuation rings

Abstract

Let F be a field, let V be a valuation ring of F of arbitrary Krull dimension (rank), let K be a finite Galois extension of F with group G, and let S be the integral closure of V in K. Let f:G× G K \0\ be a normalized two-cocycle such that f(G× G)⊂eq S \0\, but we do not require that f should take values in the group of multiplicative units of S. One can construct a crossed-product V-order Af=Σσ∈ GSxσ with multiplication given by xσsxτ=σ(s)f(σ,τ)xστ for s∈ S, σ,τ∈ G. We characterize semihereditary and Dubrovin crossed-product orders, under mild valuation-theoretic assumptions placed on the nature of the extension K/F.