Spinor Representation of O(3) for S4

Abstract

All possible permutations in the discrete S4 group are classified by three rotation angles associated with the orthogonal group O(3). We construct a spinor representation 2D of O(3), which is transformed by three 4×4 matrices corresponding to three Pauli matrices in SO(3). An irreducible decomposition of 2D 2D supplies a vector representation of 3 of O(3), thereby, of S4. Our construction is consistent with the mathematical fact that O(3)=SO(3)× Z2. The Z2 parity in the spinorial space is described by a block off-diagonal matrix as the spinorial parity operator, whose eigenvalues are 1 consistent with Z2.