A twisted derived category of hyper-Kähler varieties of 𝐾3 𝑛 -type

Key Points

• To explore the twisted derived category of hyper-Kähler varieties of K3[n]-type, and demonstrate derived equivalence under specific conditions.
• Conjectured using the Markman-Mukai lattice to control hyper-Kähler varieties.
• Proved conjectures involving projectively hyperholomorphic bundles and a twisted D-equivalence conjecture.
• Applied numerical constraints for validation of derived equivalence between fine moduli spaces.
• Confirmed that two fine moduli spaces of stable sheaves on a K3 surface are derived equivalent with the same dimension.
• Demonstrated a relationship between twisted derived categories and the Markman-Mukai lattice performance.
• Provided substantial evidence for the conjecture of Huybrechts regarding moduli space equivalence.