A note on Grothendieck groups of periodic derived categories
Abstract
We determine Grothendieck groups of periodic derived categories. In particular, we prove that the Grothendieck group of the m-periodic derived category of finitely generated modules over an Artin algebra is a free Z-module if m is even but an F2-vector space if m is odd. Its rank is equal to the number of isomorphism classes of simple modules in both cases. As an application, we prove that the number of non-isomorphic summands of a strict periodic tilting object T, which was introduced in [S21] as a periodic analogue of tilting objects, is independent of the choice of T.
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