Factor posets of frames and dual frames in finite dimensions

Abstract

We consider frames in a finite-dimensional Hilbert space where frames are exactly the spanning sets of the vector space. A factor poset of a frame is defined to be a collection of subsets of I, the index set of our vectors, ordered by inclusion so that nonempty J ⊂eq I is in the factor poset if and only if \fi\i ∈ J is a tight frame. We first study when a poset P⊂eq 2I is a factor poset of a frame and then relate the two topics by discussing the connections between the factor posets of frames and their duals. Additionally we discuss duals with regard to p minimization.