Local orders whose lattices are direct sums of ideals

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Title: Local orders whose lattices are direct sums of ideals
Author: Haefner, Jeremy
Abstract: Let R be a complete local Dedekind domain with quotient field K and let A be a local R-order in a separable K-algebra. This paper classifies those orders A such that every indecomposable R-torsionfree A-module is isomorphic to an ideal of A. These results extend to the noncommutative case some results for commutative rings found jointly by this author and L. Levy.
Description: First published in Transactions of the American Mathematical Society in vol. 321, no. 2, published by the American Mathematical Society.
Record URI: http://hdl.handle.net/1850/9480
Date: 1990-10

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