Homogeneous irreducible supermanifolds and graded Lie superalgebras

Abstract

A depth one grading g= g-1 g0 g1 ·s g of a finite dimensional Lie superalgebra g is called nonlinear irreducible if the isotropy representation adg0|g-1 is irreducible and g1 ≠ (0). An example is the full prolongation of an irreducible linear Lie superalgebra g0 ⊂ gl(g-1) of finite type with non-trivial first prolongation. We prove that a complex Lie superalgebra g which admits a depth one transitive nonlinear irreducible grading is a semisimple Lie superalgebra with the socle s (Cn), where s is a simple Lie superalgebra, and we describe such gradings. The graded Lie superalgebra g defines an isotropy irreducible homogeneous supermanifold M=G/G0 where G, G0 are Lie supergroups respectively associated with the Lie superalgebras g and g0 := p≥ 0 gp.