(-1)-Shifted Darboux theorem of derived schemes in characteristic p>2
Abstract
The derived geometry approach to Donaldson--Thomas theory (over C) is built on Pantev--To\"en--Vezzosi--Vaqui\'e's existence theorem of (-1)-shifted symplectic forms pantev2013shifted and Brav--Bussi--Joyce's shifted Darboux theorem brav2019darboux. In this paper, we prove a Darboux theorem in characteristic p>2 for the (-1)-shifted symplectic forms endowed with an infinitesimal structure. A key ingredient is Antieau's derived infinitesimal cohomology antieau2025filtrations, which enjoys a Poincar\'e-type lemma. Our argument is in fact characteristic-free and provides a conceptual understanding of the Brav--Bussi--Joyce theorem. Moreover, we extend the existence theorem of Pantev--To\"en--Vaqui\'e--Vezzosi by constructing a de Rham (-1)-shifted symplectic form on Mapk(X,Perf), where X is a Calabi--Yau 3-fold over a field k in characteristic p>2. We conjecture that this (-1)-shifted symplectic form admits an infinitesimal structure.
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