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

Contact : Elisabeth Jasserand

Supersymmetry, differential operators of infinite order and theta-functions

1 juin 2026, 10:30
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

Mikhail Kapranov (Kavli Institute)

Description

Differential operators of infinite order (DOI) are infinite series in derivatives with holomorphic coefficients decaying so fast that the action on holomorphic functions converges and preserves the domain of definition. Thus exp(d/dx) (shift operator) is not a DOI but cos(√(d/dx)) is.

In 1973 M. Sato gave a characterization of theta-zerovalues by a manifestly modular invariant system of DOI in the modular variables alone, thus deducing modularity from local conditions. This has been developed by several authors (Kashiwara, Kawai, Takei, Yoshida and others) since.

I will present a "supersymmetric" approach to Sato's theory based on two observations:
The exponential of any odd supersymmetry generator is a DOI. In some cases such odd generators, acting "on-shell" (in the space of solutions of equations of motion), satisfy even-style commutation relations

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