Wahl singularities in degenerations of del Pezzo surfaces
Abstract
For any fixed 1 ≤ ≤ 9, we characterize all Wahl singularities that appear in degenerations of del Pezzo surfaces of degree . This extends the work of Manetti and Hacking-Prokhorov in degree 9, where Wahl singularities are classified using the Markov equation. To achieve this, we introduce del Pezzo Wahl chains with markings. They define marked del Pezzo surfaces W*m that govern all such degenerations. We also prove that every marked del Pezzo surface degenerates into a canonically defined toric del Pezzo surface with only T-singularities. In addition, we establish a one-to-one correspondence between the W*m surfaces and certain fake weighted projective planes. As applications, we show that every Wahl singularity occurs for del Pezzo surfaces of degree ≤ 4, but that there are infinitely many Wahl singularities that do not arise for degrees ≥ 5. We also use Hacking's exceptional collections to provide geometric proofs of recent results by Polishchuk and Rains on exceptional vector bundles on del Pezzo surfaces.
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