Waves in Honeycomb Structures

Abstract

We review recent work of the authors on the non-relativistic Schr\"odinger equation with a honeycomb lattice potential, V. In particular, we summarize results on (i) the existence of Dirac points, conical singularities in dispersion surfaces of HV=-+V and (ii) the two-dimensional Dirac equations, as a large, but finite time, effective description of e-iHVt0, for data 0, which is spectrally localized at a Dirac point. We conclude with a formal derivation and discussion of the effective large time evolution for the nonlinear Schr\"odinger - Gross Pitaevskii equation for small amplitude initial conditions, 0. The effective dynamics are governed by a nonlinear Dirac system.