The Virial Theorem in Graphene and other Dirac Materials

Abstract

The virial theorem is applied to graphene and other Dirac Materials for systems close to the Dirac points where the dispersion relation is linear. From this, we find the exact form for the total energy given by E = B/rs where rs a0 is the mean radius of the d-dimensional sphere containing one particle, with a0 the Bohr radius, and B is a constant independent of rs. This result implies that, given a linear dispersion and a Coulombic interaction, there is no Wigner crystalization and that calculating B or measuring at any value of rs determines the energy and compressibility for all rs. In addition to the total energy we calculate the exact forms of the chemical potential, pressure and inverse compressibility in arbitrary dimension.