Projective connections on super Heisenberg coinvariants. I

Giovanni Felder; David Kazhdan; Alexander Polishchuk

arXiv:2605.02221·math.AG·May 5, 2026

Projective connections on super Heisenberg coinvariants. I

Giovanni Felder, David Kazhdan, Alexander Polishchuk

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TL;DR

This paper investigates derived coinvariants of isotropic subbundles over super Heisenberg algebras and constructs natural transitive Lie algebroids acting on these structures.

Contribution

It introduces a novel framework for understanding coinvariants in super Heisenberg algebra modules and constructs associated Lie algebroids.

Findings

01

Established a method to compute derived coinvariants.

02

Constructed natural transitive Lie algebroids on these modules.

03

Provided insights into the structure of super Heisenberg algebra representations.

Abstract

We study derived coinvariants of isotropic subbundles on modules over super Heisenberg algebras and construct certain natural transitive Lie algebroids acting on them.

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