English

From elasticity tetrads to rectangular vielbein

Classical Physics 2022-12-28 v2 Other Condensed Matter General Relativity and Quantum Cosmology High Energy Physics - Phenomenology

Abstract

The paper is devoted to the memory of Igor E. Dzyaloshinsky. In our common paper I.E. Dzyaloshinskii and G.E. Volovick, Poisson brackets in condensed matter, Ann. Phys. {\bf 125} 67--97 (1980), we discussed the elasticity theory described in terms of the gravitational field variables -- the elasticity vielbein EμaE_\mu^a. They come from the phase fields, which describe the deformations of crystal. The important property of the elasticity vielbein EμaE^a_\mu is that in general they are not the square mstrices. While the spacetime index μ\mu takes the values μ=(0,1,2,3)\mu=(0,1,2,3), in crystals the index a=(1,2,3)a=(1,2,3), in vortex lattices a=(1,2)a=(1,2), and in smectic liquid crystals there is only one phase field, a=1a=1. These phase fields can be considered as the spin gauge fields, which are similar to the gauge fields in Standard Model (SM) or in Grand Unification (GUT). On the other hand, the rectangular vielbein eaμe^\mu_a may emerge in the vicinity of Dirac points in Dirac materials. In particular, in the planar phase of the spin-triplet superfluid 3^3He the spacetime index μ=(0,1,2,3)\mu=(0,1,2,3), while the spin index aa takes values a=(0,1,2,3,4)a=(0,1,2,3,4). Although these (4×5)(4 \times 5) vielbein describing the Dirac fermions are rectangular, the effective metric gμνg^{\mu\nu}of Dirac quasiparticles remains (3+1)-dimensional. All this suggests the possible extension of the Einstein-Cartan gravity by introducing the rectangular vielbein, where the spin fields belong to the higher groups, which may include SM or even GUT groups.

Keywords

Cite

@article{arxiv.2205.15222,
  title  = {From elasticity tetrads to rectangular vielbein},
  author = {G. E. Volovik},
  journal= {arXiv preprint arXiv:2205.15222},
  year   = {2022}
}

Comments

6 pages, no figures, accepted for the issue of Ann. Phys. devoted to memory of I.E. Dzyaloshinsky

R2 v1 2026-06-24T11:33:22.247Z