Multiplicative Lidskii's inequalities and optimal perturbations of frames

Abstract

In this paper we study two design problems in frame theory: on the one hand, given a fixed finite frame for d we compute those dual frames of that are optimal perturbations of the canonical dual frame for under certain restrictions on the norms of the elements of . On the other hand, for a fixed finite frame =\fj\j∈ for we compute those invertible operators V such that V*V is a perturbation of the identity and such that the frame V· =\V\,fj\j∈ - which is equivalent to - is optimal among such perturbations of . In both cases, optimality is measured with respect to submajorization of the eigenvalues of the frame operators. Hence, our optimal designs are minimizers of a family of convex potentials that include the frame potential and the mean squared error. The key tool for these results is a multiplicative analogue of Lidskii's inequality in terms of log-majorization and a characterization of the case of equality.