Litcius/Paper detail

Optical vortex beams with a symmetric and almost symmetric OAM spectrum

Victor V. Kotlyar, A. A. Kovalev

2021Journal of the Optical Society of America A16 citationsDOI

Abstract

We show both theoretically and numerically that if an optical vortex beam has a symmetric or almost symmetric angular harmonics spectrum [orbital angular momentum (OAM) spectrum], then the order of the central harmonic in the OAM spectrum equals the normalized-to-power OAM of the beam. This means that an optical vortex beam with a symmetric OAM spectrum has the same topological charge and the normalized-to-power OAM has an optical vortex with only one central angular harmonic. For light fields with a symmetric OAM spectrum, we give a general expression in the form of a series. We also study two examples of form-invariant (structurally stable) vortex beams with their topological charges being infinite, while the normalized-to-power OAM is approximately equal to the topological charge of the central angular harmonic, contributing the most to the OAM of the entire beam.

Topics & Concepts

Topological quantum numberPhysicsOptical vortexAngular momentumLight beamHarmonicsVortexOpticsBeam (structure)Orbital angular momentum of lightTopology (electrical circuits)Quantum mechanicsTotal angular momentum quantum numberMathematicsVoltageCombinatoricsThermodynamicsOrbital Angular Momentum in OpticsNonlinear Photonic SystemsPlant Reproductive Biology