English

Deforming the Maxwell-Sim Algebra

High Energy Physics - Theory 2014-11-20 v2

Abstract

The Maxwell alegbra is a non-central extension of the Poincar\'e algebra, in which the momentum generators no longer commute, but satisfy [Pμ,Pν]=Zμν[P_\mu,P_\nu]=Z_{\mu\nu}. The charges ZμνZ_{\mu\nu} commute with the momenta, and transform tensorially under the action of the angular momentum generators. If one constructs an action for a massive particle, invariant under these symmetries, one finds that it satisfies the equations of motion of a charged particle interacting with a constant electromagnetic field via the Lorentz force. In this paper, we explore the analogous constructions where one starts instead with the ISim subalgebra of Poincar\'e, this being the symmetry algebra of Very Special Relativity. It admits an analogous non-central extension, and we find that a particle action invariant under this Maxwell-Sim algebra again describes a particle subject to the ordinary Lorentz force. One can also deform the ISim algebra to DISimb_b, where bb is a non-trivial dimensionless parameter. We find that the motion described by an action invariant under the corresponding Maxwell-DISim algebra is that of a particle interacting via a Finslerian modification of the Lorentz force.

Keywords

Cite

@article{arxiv.0910.3220,
  title  = {Deforming the Maxwell-Sim Algebra},
  author = {G. W. Gibbons and Joaquim Gomis and C. N. Pope},
  journal= {arXiv preprint arXiv:0910.3220},
  year   = {2014}
}

Comments

Appendix on Lifshitz and Schrodinger algebras added

R2 v1 2026-06-21T13:59:29.444Z