On a class of Fock-like representations for Lie Superalgebras

Abstract

Utilizing Lie superalgebra (LS) realizations via the Relative Parabose Set algebra PBF, combined with earlier results on the Fock-like representations of PBF(1,1), we proceed to the construction of a family of Fock-like representations of LSs: these are infinite dimensional, decomposable super-representations, which are parameterized by the value of a positive integer p. They can be constructed for any LS L, either initiating from a given 2-dimensional, Z2-graded representation of L or using its inclusion as a subalgebra of PBF(1,1). As an application we proceed in studying decompositions with respect to various low-dimensional Lie algebras and superalgebras.