Projections and idempotents with fixed diagonal and the homotopy problem for unit tight frames
arXiv:0906.0139
Abstract
We investigate the topological and metric structure of the set of idempotent operators and projections which have prescribed diagonal entries with respect to a fixed orthonormal basis of a Hilbert space. As an application, we settle some cases of conjectures of Larson, Dykema, and Strawn on the connectedness of the set of unit-norm tight frames.
New title and introduction