Existence of the lattice on general H-type groups

Abstract

Let N be a two step nilpotent Lie algebra endowed with non-degenerate scalar product ·\,,· and let N=VZ, where Z is the center of the Lie algebra and V its orthogonal complement with respect to the scalar product. We prove that if (V,·\,,·V) is the Clifford module for the Clifford algebra (Z,·\,,·Z) such that the homomorphism J (Z,·\,,·Z)(V) is skew symmetric with respect to the scalar product ·\,,·V, or in other words the Lie algebra N satisfies conditions of general H-type Lie algebras ~Ciatti, GKM, then there is a basis with respect to which the structural constants of the Lie algebra N are all 1 or 0.