Stability conditions on a singular quadric threefold

Abstract

Let X ⊂ P4 be a quadric threefold with a single ordinary double point, and let Ku(X) be its Kuznetsov component. In this paper, we construct a weak stability condition on Kuznetsov's categorical resolution D ⊂ Db(X), compatible with the Verdier localization Rπ* D Db(X), and hence obtain a Bridgeland stability condition on Db(X). Restricting the construction, we obtain the corresponding statement for Ku(X) and its categorical resolution D'. These can be viewed as a three-dimensional analogue of our previous result in Cho25. We describe the geometry of the blow-up π X X and obtain two semiorthogonal decompositions of Db(X), arising from the projective bundle structure of X and from Kuznetsov's categorical resolution. Comparing them, we isolate an admissible subcategory D⊂ Db(X) resolving Db(X) and show that it admits a full Ext-exceptional collection, from which we construct the localization-compatible weak stability condition.

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