Complete classification of H-type algebras: I

Abstract

Let N be a 2-step nilpotent Lie algebra endowed with non-degenerate scalar product .\,,. and let N=VZ, where Z is the centre of the Lie algebra and V its orthogonal complement with respect to the scalar product. We study the classification of the Lie algebras for which the space V arises as a representation space of a Clifford algebra ( Rr,s) and the representation map J ( Rr,s)(V) is related to the Lie algebra structure by Jzv,w= z,[v,w] for all z∈ Rr,s and v,w∈ V. The classification is based on the range of parameters r and s and is completed for the Clifford modules V, having minimal possible dimension, that are not necessary irreducible. We find the necessary condition for the existence of a Lie algebra isomorphism according to the range of integer parameters 0≤ r,s<∞. We present the constructive proof for the isomorphism map for isomorphic Lie algebras and defined the class of non-isomorphic Lie algebras.