Equivalent Mueller matrix method for 3-D axial error analysis in 2-D SoP measurement

We explored an equivalent Mueller matrix method for analyzing 3-D axial errors in 2-D polarization state measurements for the first time, to the best of our knowledge. The method treats 2-D devices with 3-D errors as a closed system, within which the transformation of a 3-D polarization field is described using a 3 x 3 coherency matrix and generalized Jones matrix (GJM). The equivalent 4 x 4 Mueller matrix of the component is numerically evaluated from the 2-D polarization field information at the input and output ports. Furthermore, our research has identified that any 3-D axial error within the polarization state analyzer (PSA) can be classified into two categories: axial alignment error (AAE) and wave -vector alignment error (WAE). For the latter case, we have introduced a concept of equal weight variance of a wave -vector as an alternative to the spiral sampling method to estimate the upper -bound of relative state of polarization (SoP) error. A simulation result shows that for the ideal bi-plate PSA, the upperbound remains below 3% when the deviation value is less than 17.7 deg. The equivalent Mueller matrix method can be applied to analyze the 3-D errors in an arbitrary sort of PSA, and the description of 3-D transformation in this paper is simpler than a 9 x 9 generalized Mueller matrix and nine -element generalized Stokes vector, which has potential value in the research of vector beam generation. (c) 2024 Optica Publishing Group