Superconformal structures on the three-sphere
Abstract
With the motivation to develop superconformal field theory on S^3, we introduce a 2n-extended supersphere S^{3|4n}, with n=1,2,..., as a homogeneous space of the three-dimensional Euclidean superconformal group OSp(2n|2,2) such that its bosonic body is S^3. Supertwistor and bi-supertwistor realizations of S^{3|4n} are derived. We study in detail the n=1 case, which is unique in the sense that the R-symmetry subgroup SO^*(2n) of the superconformal group is compact only for n=1. In particular, we show that the OSp(2|2,2) transformations preserve the chiral subspace of S^{3|4}. Several supercoset realizations of S^{3|4n} are presented. Harmonic/projective extensions of the supersphere by auxiliary bosonic fibre directions are sketched.
Keywords
Cite
@article{arxiv.1406.7090,
title = {Superconformal structures on the three-sphere},
author = {Sergei M. Kuzenko and D. Sorokin},
journal= {arXiv preprint arXiv:1406.7090},
year = {2015}
}
Comments
44 pages; V2: references added, typos corrected; V3: comments in Appendix B corrected