A finite dimensional algebra with a phantom (a corollary of an example by J. Krah)

Abstract

We observe that there exists an associative finite dimensional C-algebra A of finite global dimension, such that the bounded derived category Db(A) of finite dimensional A-modules admits an admissible subcategory P with vanishing Grothendieck group K0(P). In other words, P ⊂eq Db(A) is a phantom. Using tilting theory, this follows directly from a very recent example of a phantom for a smooth rational surface due to Krah. By work of Aihara & Iyama, this also leads to new examples of presilting objects that cannot be completed to silting objects.