Systems of submodules and a remark by M.C.R. Butler

Abstract

Fix a poset P and a natural number n. For various commutative local rings , each of Loewy length n, consider the category sub P of -linear submodule representations of P. We give a criterion for when the underlying translation quiver of a connected component of the Auslander-Reiten quiver of sub P is independent of the choice of the base ring . If P is the one-point poset and = Z/pn for p a prime number, then sub P consists of all pairs (B;A) where B is a finite abelian pn-bounded group and A⊂ B a subgroup. We can respond to a remark by M. C. R. Butler concerning the first occurence of parametrized families of such subgroup embeddings.

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