Geometric realizations of the Lie superalgebra D(2,1;a)

Abstract

For every parabolic subgroup P of a Lie supergroup G, the homogeneous superspace G/P carries a G-invariant supergeometry. We address the question whether g=Lie(G) is the maximal supersymmetry of this supergeometry in the case of the exceptional Lie superalgebra D(2,1;a). For each choice of parabolic p⊂g, we consider the corresponding negatively graded Lie subalgebra m⊂g, and compute its Tanaka--Weisfeiler prolongations, with reduction of the structure group when required, thus realizing D(2,1;a) via symmetries of supergeometries. This gives 6 inequivalent supergeometries: one of these is a vector superdistribution, two are given by cone fields of supervarieties, and the remaining three are higher order structure reductions (a novel feature). We describe those supergeometries and realize D(2,1;a) supersymmetry explicitly in each case.