Chirality and helicity of optical vortices of small beam waists

Abstract

The chirality and helicity of linearly polarised Laguerre-Gaussian (LG) beams are examined. Such a type of light possesses a substantial longitudinal field when its beam waist is sufficiently small and so gives rise to non-zero chirality and helicity. In the simplest case of a doughnut beam of winding number =1 and another identical to it but has = -1, we obtain different chirality and helicity distributions at the focal plane z=0. We also show that this chiral behaviour persists and the patterns evolve so that on planes at z<0 and z>0 the beam convergence contributes differently to the changes in the chirality and helicity distributions.