1–2 juin 2026
Le Bois-Marie
Fuseau horaire Europe/Paris

Contact : Elisabeth Jasserand

Chi-independence for moduli spaces of one-dimensional sheaves on symplectic surfaces

1 juin 2026, 14:15
1h
Centre de conférences Marilyn et James Simons (Le Bois-Marie)

Centre de conférences Marilyn et James Simons

Le Bois-Marie

35, route de Chartres 91440 Bures-sur-Yvette

Orateur

Olivier Schiffmann (CNRS-Laboratoire de Mathématiques d'Orsay)

Description

Moduli spaces $M(\beta; \chi)$ of one-dimensional sheaves on a complex K3 or abelian surface S have a rich and well-studied enumerative geometry. In this work, we prove that the so-called BPS cohomology (or Donaldson-Thomas invariants) of $M(\beta;\chi)$ is independent of $\chi$ --the Euler characteristic--for any curve class $\beta$. We establish a relative version of this statement, conjectured by Toda in 2019, over the Chow variety of $1$-cycles on $S$. We do this by constructing an action of the cohomological Hall algebra of zero-dimensional sheaves on the BPS Lie algebra of the stack of coherent sheaves on $S$.

This is joint work with B. Davison, L. Hennecart, T. Kinjo and E. Vasserot.

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