On the structure of graded Lie superalgebras

Abstract

We study the structure of graded Lie superalgebras with arbitrary dimension and over an arbitrary field K. We show that any of such algebras L with a symmetric G-support is of the form L = U + ΣjIj with U a subspace of L1 and any Ij a well described graded ideal of L, satisfying [Ij,Ik] = 0 if j≠ k. Under certain conditions, it is shown that L = (k ∈ K Ik) (q ∈ Q Iq), where any Ik is a gr-simple graded ideal of L and any Iq a completely determined low dimensional non gr-simple graded ideal of L, satisfying [Iq,Iq'] = 0 for any q'∈ Q with q ≠ q'.