A new phantom on a rational surface
Abstract
We construct a universal phantom subcategory on the blow-up of the complex projective plane in 11 general points. This phantom subcategory is the orthogonal complement of a non-full exceptional collection of line bundles of maximal length. It provides a new counterexample to a conjecture of Kuznetsov and to a conjecture of Orlov. The first counterexample was constructed by Krah [Invent. Math. 235 (2024),1009--1018]. As an application, we construct a new co-connective DG-algebra whose derived category is a phantom.
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