Superparticle Models with Tensorial Central Charges

TL;DR

This paper generalizes superparticle models by incorporating tensorial central charges and twistor variables, revealing a spectrum of massless states with varying supersymmetry properties and geometric interpretations across different dimensions.

Contribution

It introduces a one-parameter family of superparticle models with tensorial charges, extending known supertwistor formulations and analyzing their quantum spectra and geometric structures.

Findings

Quantum spectrum includes massless states of arbitrary helicity.

Model interpolates between different supertwistor groups depending on parameter a.

Extra degrees of freedom parametrize compact manifolds related to helicity states.

Abstract

A generalization of the Ferber-Shirafuji formulation of superparticle mechanics is considered. The generalized model describes the dynamics of a superparticle in a superspace extended by tensorial central charge coordinates and commuting twistor-like spinor variables. The D=4 model contains a continuous real parameter $a\geq 0$ and at a=0 reduces to the SU(2,2|1) supertwistor Ferber-Shirafuji model, while at a=1 one gets an OSp(1|8) supertwistor model of ref. [1] (hep-th/9811022) which describes BPS states with all but one unbroken target space supersymmetries. When 0<a<1 the model admits an OSp(2|8) supertwistor description, and when a>1 the supertwistor group becomes OSp(1,1|8). We quantize the model and find that its quantum spectrum consists of massless states of an arbitrary (half)integer helicity. The independent discrete central charge coordinate describes the helicity spectrum. We also outline the generalization of the a=1 model to higher space-time dimensions and demonstrate that in D=3,4,6 and 10, where the quantum states are massless, the extra degrees of freedom (with respect to those of the standard superparticle) parametrize compact manifolds. These compact manifolds can be associated with higher-dimensional helicity states. In particular, in D=10 the additional ``helicity'' manifold is isomorphic to the seven-sphere.