Organized by:
Sheel Ganatra (USC)
Yusuf Barış Kartal (National University of Singapore)
Adeel Khan (Academia Sinica)
John Pardon (SCGP)
Quantum geometry studies the quantization of classical invariants such as cohomology or intersection numbers, i.e. structures such as quantum cohomology and Lagrangian Floer theory in algebraic and symplectic geometry. Many recent developments in quantum geometry have been shaped by the techniques of homotopical geometry, which enriches the rigid structures of classical geometry with the flexible language of homotopy theory. This program proposes to explore the interactions between quantum and homotopical geometry, with an emphasis on how contemporary techniques in each field generate advances in the other.