Four Dimensional Graphene

Abstract

Mimicking pristine 2D graphene, we revisit the BBTW model for 4D lattice QCD given in ref.[5] by using the hidden SU(5) symmetry of the 4D hyperdiamond lattice H4. We first study the link between the H4 and SU(5); then we refine the BBTW 4D lattice action by using the weight vectors λ1, λ2, λ3, λ4, λ5 of the 5-dimensional representation of SU(5) satisfying iλi=0. After that we study explicitly the solutions of the zeros of the Dirac operator D in terms of the SU(5) simple roots α1, α2, α3, α4 generating H4; and its fundamental weights ω1, ω2, ω3, ω4 which generate the reciprocal lattice H4. It is shown, amongst others, that these zeros live at the sites of H4; and the continuous limit D is given by ((id5)/2) γμkμ with d, γμ and kμ standing respectively for the lattice parameter of H4, the usual 4 Dirac matrices and the 4D wave vector. Other features such as differences with BBTW model as well as the link between the Dirac operator following from our construction and the one suggested by Creutz using quaternions, are also given. Keywords: Graphene, Lattice QCD, 4D hyperdiamond, BBTW model, SU(5) Symmetry.