Factorizations for 3-rotations and polarization of the light in Mueller-Stokes an Jones formalisms

Abstract

Formulas describing all 2-element and 3-element factorizations of arbitrary element of the groups SU(2) and SO(3,R) are derived. Six 2-element factorizations, (U2U3U'2), (U3U2U'3), (U3U1U'3), (U1U3U'1), (U1U2U'1), (U2U1U'2), provide all possible way to define Euler type angles; and six 3-element ones, (U1U2U3), (U1U3U'2), (U2U3U1), (U2U1U3), (U3U1U2), (U3U2U1) provide all possible ways to parameterize the unitary and orthogonal groups by three elementary angles. In thecontext the light polarization formalism of Stokes-Mueller vectors and Jones spinors, relations produced give a base to resolve arbitrary pure polarization rotators into all possible sets of elementary rotators of two or three constituents.