Finitistic Weak Dimension of Commutative Arithmetical Rings

Francois Couchot

Finitistic Weak Dimension of Commutative Arithmetical Rings

Abstract

It is proven that each commutative arithmetical ring R has a finitistic weak dimension ≤ 2. More precisely, this dimension is 0 if R is locally IF, 1 if R is locally semicoherent and not IF, and 2 in the other cases.

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