Quaternionic structures, supertwistors and fundamental superspaces

TL;DR

This paper develops a quaternionic framework for superspaces and supertwistors, extending previous models to include gravitational fields and addressing algebraic inconsistencies in superconformal theories.

Contribution

It introduces a quaternionic construction of superspaces that naturally incorporates supertwistors and extends to include gravitational interactions.

Findings

Quaternionic superspaces are constructed using supercoherent states.

The approach separates classes of superspaces and their symmetry groups.

The quaternionic method resolves algebraic inconsistencies in superalgebras.

Abstract

Superspace is considered as space of parameters of the supercoherent states defining the basis for oscillator-like unitary irreducible representations of the generalized superconformal group SU(2m,2n/2N) in the field of quaternions H. The specific construction contains naturally the supertwistor one of the previous work by Litov and Pervushin [1] and it is shown that in the case of extended supersymmetry such an approach leads to the separation of a class of superspaces and and its groups of motion. We briefly discuss this particular extension to the domain of quaternionic superspaces as nonlinear realization of some kind of the affine and the superconformal groups with the final end to include also the gravitational field[6] (this last possibility to include gravitation, can be realized on the basis of the reference[12] where the coset ((Sp(8))/(SL(4R)))~((SU(2,2))/(SL(2C)))was used in the non supersymmetric case). It is shown that this quaternionic construction avoid some unconsistencies appearing at the level of the generators of the superalgebras (for specific values of p and q; p+q=N) in the twistor one.