Gauss--Berezin integral operators and spinors over supergroups $\mathrm{OSp}(2p|2q)$, and Lagrangian super-Grasmannians

TL;DR

This paper develops explicit formulas for the spinor representation of the real orthosymplectic supergroup using Gauss--Berezin operators, extends it to a larger domain, and connects it to Lagrangian super-Grassmannians, revealing a new operator-valued function framework.

Contribution

It introduces explicit integral formulas for the spinor representation of $ ext{OSp}(2p|2q)$, extends the representation to complex domains and semigroups, and links it to Lagrangian super-Grassmannians as a new functional perspective.

Findings

Explicit formulas for the spinor representation using Gauss--Berezin operators.

Extension of the representation to complex domains and semigroups.

Representation as an operator-valued function on Lagrangian super-Grassmannians.

Abstract

We obtain explicit formulas for the spinor representation $\rho$ of the real orthosymplectic supergroup $\mathrm{OSp}(2p|2q,\mathbb{R})$ by integral 'Gauss--Berezin' operators. Next, we extend $\rho$ to a complex domain and get a representation of a larger semigroup, which is a counterpart of Olshanski subsemigroups in semisimple Lie groups. Further, we show that $\rho$ can be extended to an operator-valued function on a certain domain in the Lagrangian super-Grassmannian (graphs of elements of the supergroup $\mathrm{OSp}(2p|2q,\mathbb{C})$ are Lagrangian super-subspaces) and show that this function is a 'representation' in the following sense: we consider Lagrangian subspaces as linear relations and composition of two Lagrangian relations in general position corresponds to a product of Gauss--Berezin operators