Irreducible representations of $\mathbb{Z}_2^2$-graded ${\cal N} =2$ supersymmetry algebra and $\mathbb{Z}_2^2$-graded supermechanics

Abstract: Irreducible representations (irreps) of Z 2 2 -graded supersymmetry algebra of N = 2 are obtained by the method of induced representation and they are used to derive Z 2 2 -graded supersymmetric classical actions. The irreps are four dimensional for λ = 0 where λ is an eigenvalue of the Casimir element, and eight dimensional for λ = 0. The eight dimensional irreps reduce to four dimensional ones only when λ and an eigenvalue of Hamiltonian satisfy a particular relation. The reduced four dimensional irreps are … Show more