Three-Dimensional Nonlinear Stokes - Mueller Polarimetry

Abstract

The formalism is developed for a tree-dimensional (3D) nonlinear Stokes-Mueller polarimetry. The expressions are derived for the generalized 3D linear and nonlinear Stokes vectors, and the corresponding nonlinear Mueller matrix. The coherency-like Hermitian square matrix X of susceptibilities is introduced, which is derived from the nonlinear Mueller matrix. The X-matrix is characterized by the index of depolarization. Several decompositions of the X-matrix are introduced. The 3D nonlinear Stokes-Mueller polarimetry formalism can be applied for three and higher wave mixing processes. The 3D polarimetric measurements can be used for structural investigations of materials, including heterogeneous biological structures. The 3D polarimetry is applicable for nonlinear microscopy with high numerical aperture objectives.