Powers of ghost ideals

Abstract

A theory of ordinal powers of the ideal gS of S-ghost morphisms is developed by introducing for every ordinal λ, the λ-th inductive power J(λ) of an ideal J. The Generalized λ-Generating Hypothesis (λ-GGH) for an ideal J of an exact category A is the proposition that the λ-th inductive power J(λ) is an object ideal. It is shown that under mild conditions every inductive power of a ghost ideal is an object-special preenveloping ideal. When λ is infinite, the proof is based on an ideal version of Eklof's Lemma. When λ is an infinite regular cardinal, the Generalized λ-Generating Hypothesis is established for the ghost ideal gS for the case when A a locally λ-presentable Grothendieck category and S is a set of λ-presentable objects in A such that (S) contains a generating set for A. As a consequence of λ-GGH for the ghost ideal gR-mod in the category of modules R-Mod over a ring, it is shown that if the class of pure projective left R-modules is closed under extensions, then every left FP-projective module is pure projective. A restricted version n-GGH(g(C(R))) for the ghost ideal in C(R)) is also considered and it is shown that n-GGH(g(C(R))) holds for R if and only if the n-th power of the ghost ideal in the derived category D(R) is zero if and only if the global dimension of R is less than n. If R is coherent, then the Generating Hypothesis holds for R if and only if R is von Neumann regular.

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