Homological finiteness conditions for groups, monoids and algebras
Abstract
Recently Alonso and Hermiller introduced a homological finiteness condition bi-FPn (here called weak bi-FPn) for monoid rings, and Kobayashi and Otto introduced a different property, also called bi-FPn (we adhere to their terminology). From these and other papers we know that: bi-FPn ⇒ left and right FPn ⇒ weak bi-FPn; the first implication is not reversible in general; the second implication is reversible for group rings. We show that the second implication is reversible in general, even for arbitrary associative algebras (Theorem 1'), and we show that the first implication is reversible for group rings (Theorem 2). We also show that the all four properties are equivalent for connected graded algebras (Theorem 4). A result on retractions (Theorem 3') is proved, and some questions are raised.
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