Higher Koszul algebras and the (Fg)-condition
Abstract
Determining when a finite dimensional algebra satisfies the finiteness property known as the (Fg)-condition is of fundamental importance in the celebrated and influential theory of support varieties. We give an answer to this question for higher Koszul algebras, generalizing a result by Erdmann and Solberg. This allows us to establish a strong connection between the (Fg)-condition and higher homological algebra, which significantly extends the classes of algebras for which it is known whether the (Fg)-condition is satisfied. In particular, we show that the condition holds for an important class of algebras arising from consistent dimer models.
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