All Quiet on the Exceptional Locus

Abstract

We study admissible subcategories of the bounded derived category of a smooth projective surface that are supported on the exceptional locus of a birational morphism. We prove that if f:X Y is a birational morphism of smooth projective surfaces, then every admissible subcategory of Db(X) supported on Exc(f) is generated by a finite exceptional collection. Moreover, if KY is nef, then the same conclusion holds for every admissible subcategory of Db(X) supported on a proper closed subset of X. As a consequence, no nonzero phantom or quasi-phantom subcategory on such a surface can have proper support. The proof combines a splitting lemma for admissible subcategories inside a semiorthogonal decomposition with a single exceptional block, Orlov's blow-up formula, and Pirozhkov's support theorem.