The core of a Grassmannian frame

Abstract

Let X=\xi\i=1m be a set of unit vectors in n. The coherence of X is (X):=i=j| xi, xj|. A vector x∈ X is said to be isolable if there are no unit vectors x' arbitrarily close to x such that | x', y|<(X) for all other vectors y in X. We define the core of a Grassmannian frame X=\xi\i=1m in n at angle α as a maximal subset of X which has coherence α and has no isolable vectors. In other words, if Y is a subset of X, (Y)=α, and Y has no isolable vectors, then Y is a subset of the core. We will show that every Grassmannian frame of m>n vectors for n has the property that each vector in the core makes angle α with a spanning family from the core. Consequently, the core consists of n+1 vectors. We then develop other properties of Grassmannian frames and of the core.