On infinite rank integral representations of groups and orders of finite lattice type
نویسنده
چکیده
Let = ZG be the integer group ring of a group, G, of prime order. A main result of this note is that every -module with a free underlying abelian group decomposes into a direct sum of copies of the well-known indecomposable -lattices of finite rank. The first part of the proof reduces the problem to one about countably generated modules, and works in a wider context of suitably restricted modules over orders of finite lattice type of a quite general type. However, for countably generated modules, use is seemingly needed of the classical theory of -lattices.
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تاریخ انتشار 2004