TY - JOUR AB - We investigate the formation of photonic crystal waveguide (PCW) modes within the framework of perturbation theory. We derive a differential equation governing the envelope of PCW modes constructed from weak perturbations using an effective mass formulation based on the Luttinger-Kohn method from solid-state physics. The solution of this equation gives the frequency of the mode and its field. The differential equation lends itself to simple analytic approximations which reduce the problem to that of solving slab waveguide modes. By using this model, we demonstrate that the nature of the projected band structure and corresponding Bloch functions are central to the behaviour of PCW modes. With this understanding, we explain why the odd mode in a hexagonal PCW spans the entire Brillouin zone while the even mode is cut off. © 2009 Optical Society of America. AU - Mahmoodian, S AU - Poulton, CG AU - Dossou, KB AU - McPhedran, RC AU - Botten, LC AU - De Sterke, CM DA - 2009/01/01 DO - 10.1364/OE.17.019629 EP - 19643 JO - Optics Express PY - 2009/01/01 SP - 19629 TI - Modes of shallow photonic crystal waveguides: Semi-analytic treatment VL - 17 Y1 - 2009/01/01 Y2 - 2024/03/28 ER -