Weyl fermions in a family of Gödel-type geometries with a topological defect
arXiv:1705.10631 · doi:10.1142/S021827181850027X
Abstract
In this paper we study Weyl fermions in a family of Gödel-type geometries in Einstein general relativity. We also consider that these solutions are embedded in a topological defect background. We solve the Weyl equation and find the energy eigenvalues and eigenspinors for all three cases of Gödel-type geometries where a topological defect is passing through them. We show that the presence of a topological in these geometries contributes to modification of the spectrum of energy. The energy zero modes for all three cases of the Gödel geometries are discussed.
19 pages. Revised version accepted for publication in IJMPD