On the triviality of inhomogeneous deformations of osp(1|2n)

Abstract

We analyze the triviality of inhomogeneous γ-deformations of the oscillator Lie superalgebra B(0,n) = osp(1|2n). As the main theorem, we show that for n ≥ 2, the γ-deformation is trivial if and only if all deformation parameters vanish. The proof is based on the explicit construction of 2n certificates (left null space vectors c satisfying c Aμ = 0 and c Lμ ≠ 0) for the structure constant matrices Aμ of the coboundary operator. We provide a unified construction of certificates classified into three Families, and in particular clarify the geometric meaning of the coefficient 1 + δn,2 that appears in the Family~III certificate. We also discuss the contrast with the exceptional case of B(0,1) = osp(1|2) (where all deformations are trivial). As an appendix, we outline the computational verification performed using exact rational arithmetic over Q.