Asymptotic Properties of Filtrations of Ideals
Abstract
We introduce a unified framework for studying persistence phenomena in commutative algebra via filtrations of ideals. For a filtration F = \Ii\i ∈ N, we define F-persistence and F-strong persistence, extending the classical notions for ordinary and symbolic powers of ideals. We show that if F is strongly persistent, then Fsym is strongly persistent, where Fsym denotes the symbolic filtration associated with the filtration F. In addition, we prove that if F is strongly persistent, then F is persistent.
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