Dihedral Group Frames which are Maximally Robust to Erasures

Abstract

Let n be a natural number larger than two. Let D2n= r,s : rn=s2=e, srs=rn-1 be the Dihedral group, and an n-dimensional unitary representation of D2n acting in Cn as follows. ( (r)v)(j)=v((j-1) n) and ((s)v)(j)=v((n-j) n) for v∈Cn. For any representation which is unitarily equivalent to , we prove that when n is prime there exists a Zariski open subset E of Cn such that for any vector v∈ E, any subset of cardinality n of the orbit of v under the action of this representation is a basis for Cn. However, when n is even there is no vector in Cn which satisfies this property. As a result, we derive that if n is prime, for almost every (with respect to Lebesgue measure) vector v in Cn the -orbit of v is a frame which is maximally robust to erasures. We also consider the case where τ is equivalent to an irreducible unitary representation of the Dihedral group acting in a vector space Hτ∈\C,C2\ and we provide conditions under which it is possible to find a vector v∈Hτ such that τ( ) v has the Haar property.