Buchsbaum ring

In mathematics, Buchsbaum rings are Noetherian local rings such that every system of parameters is a weak sequence. A sequence ${\displaystyle (a_1,\cdots ,a_r)}$ of the maximal ideal ${\displaystyle m}$ is called a weak sequence if ${\displaystyle m\cdot ((a_1,\cdots ,a_{i-1}):a_i)\subset (a_1,\cdots ,a_{i-1})}$ for all ${\displaystyle i}$.

They were introduced by Template:Harvs and are named after David Buchsbaum.

Every Cohen–Macaulay local ring is a Buchsbaum ring. Every Buchsbaum ring is a generalized Cohen–Macaulay ring.

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