On the matrix realization of the Lie superalgebra of contact projective vector fields spo(2l+2|n)

Abstract

In this paper, we show that the Lie superalgebra spo(2l+2|n) is into the intersection of Lie superalgebra of contact vector fields K(2l+1|n) and the Lie superalgebra of projective vector fields pgl(2l+2|n). We use mainly the embedding used by P. Mathonet and F. Radoux in " Projectively equivariant quantizations over superspace Rp|q. Lett. Math. Phys, 98: 311-331, 2011". Explicitly, we use the embedding of a Lie superalgebra constituted of matrices belonging to (2l+2|n) into Vect(2l+1|n). We generalize thus in superdimension 2l+1-n, the matrix realization described in MelNibRad13 on S1|2. We mention that the intersection (2l+2|n)=(2l+2|n)(2l+1|n) that we prove here, in super case, has been prooved on 2l+2 in even case in CoOv12.