Abstract
The key result of this work is the use of the global characteristics of the polarization singularities of the entire beam as a whole, rather than the analysis of local polarization, Stokes and Poincare–Hopf indices. We extend Berry’s concept of the topological charge of scalar beams to hybrid vector beams. We discuss tightly focusing a new type of nth-order hybrid vector light field comprising n C-lines (circular polarization lines). Using a complex Stokes field, it is shown that the field polarization singularity index equals n/2 and does not preserve in the focal plane. The intensity and Stokes vector components in the focal plane are expressed analytically. It is theoretically and numerically demonstrated that at an even n, the intensity pattern at the focus is symmetrical, and instead of C-lines, there occur C-points around which axes of polarization ellipses are rotated. At n = 4, C-points characterized by singularity indices 1/2 and ‘lemon’-type topology are found at the focus. For an odd source field order n, the intensity pattern at the focus has no symmetry, and the field becomes purely vectorial (with no elliptical polarization) and has n V-points, around which linear polarization vectors are rotating.
Highlights
The key result of this work is the use of the global characteristics of the polarization The key result of this work is the use of the global characteristics of the polarization singularities of the entire beam as a whole, rather than the analysis of local polarization, singularities of the entire beam as a whole, rather than the analysis of local polarization, Stokes and Poincare–Hopf indices [3]
We have shown in our topological charge of scalar beams to structured vector beams
We have and numerically studied a new type of nth order hybrid vector light field thattheoretically is tightly focused with an aplanatic system
Summary
Vector singularities as a generalization of scalar singularities were proposed in 1983 by J.F. Nye [1], where lines of zero-valued transverse components of the E-field were called ‘disclinations’ (to distinguish them from scalar edge and screw dislocations [2]). Nye [1], where lines of zero-valued transverse components of the E-field were called ‘disclinations’ (to distinguish them from scalar edge and screw dislocations [2]) We aim to determine topological charges and singularity indices of the whole light field Such studies become relevant due to a growing number of publications concerned with inhomogeneously polarized vector fields [4]. Polarization singularities are described by singularity indices, which are calculated to the topological charges of scalar light fields [12].
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