ndZ-cluster tilting subcategories of d-Nakayama algebras
Abstract
Jasso-K\"ulshammer introduced the class of d-Nakayama algebras as a higher dimensional analogue of Nakayama algebras. In particular, they are endowed with a distinguished dZ-cluster tilting subcategory. In this paper, we investigate which d-Nakayama algebras admit an ndZ-cluster tilting subcategory for n>1. The radical square zero case is already covered by results on classical Nakayama algebras due to Herschend-Kvamme-Vaso. For each remaining non-self-injective d-Nakayama algebra, we provide a complete classification of its ndZ-cluster tilting subcategories. In fact, there exists at most one for a suitable integer n. A self-injective d-Nakayama algebra is determined by two positive integers m and l. We show that an ndZ-cluster tilting subcategory is only possible if n|m and n|(l-2). In case n=l-2, we show that such subcategory does indeed exist by constructing an explicit example.
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