Minimal bosonization of double-graded supersymmetric quantum mechanics

Abstract

The superalgebra of 22-graded supersymmetric quantum mechanics is shown to be realizable in terms of a single bosonic degree of freedom. Such an approach is directly inspired by a description of the corresponding 2-graded superalgebra in the framework of a Calogero-Vasiliev algebra or, more generally, of a generalized deformed oscillator algebra. In the case of the 22-graded superalgebra, the central element Z has the property of distinguishing between degenerate eigenstates of the Hamiltonian.