Derived-equivalent rational threefolds
classification
🧮 math.AG
keywords
threefoldsariseblow-upscategoriesconfigurationsconjecturecontrarycremona
read the original abstract
We describe an infinite set of smooth projective threefolds that have equivalent derived categories but are not isomorphic, contrary to a conjecture of Kawamata. These arise as blow-ups of $\mathbb P^3$ at various configurations of 8 points, which are related by Cremona transformations.
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