Quasi-quadratic modules in pseudo-valuation domain

Abstract

We study quasi-quadratic modules in a pseudo-valuation domain A whose strict units admit a square root. Let XRN denote the set of quasi-quadratic modules in an R-module N, where R is a commutative ring. It is known that there exists a unique overring B of A such that B is a valuation ring with the valuation group (G,≤) and the maximal ideal of B coincides with that of A. Let F be the residue field of B. In the above setting, we found a one-to-one correspondence between XAA and a subset of Πg ∈ G,g ≥ e XF0F.

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