Dihedral Group Frames with the Haar Property

Abstract

We consider a unitary representation of the Dihedral group D2n% =Zn2 obtained by inducing the trivial character from the co-normal subgroup \0\2. This representation is naturally realized as acting on the vector space Cn. We prove that the orbit of almost every vector in Cn with respect to the Lebesgue measure has the Haar property (every subset of cardinality n of the orbit is a basis for Cn) if n is an odd integer. Moreover, we provide explicit sufficient conditions for vectors in Cn whose orbits have the Haar property. Finally, we derive that the orbit of almost every vector in Cn under the action of the representation has the Haar property if and only if n is odd. This completely settles a problem which was only partially answered in Oussa.