Convexity of sums of eigenvalues of a segment of unitaries

Abstract

For a n× n unitary matrix u=ez with z skew-Hermitian, the angles of u are the arguments of its spectrum, i.e. the spectrum of -iz. For 1 m n, we show that sm(t), the sum of the first m angles of the path t etxey of unitary matrices, is a convex function of t (provided the path stays in a vecinity of the identity matrix). This vecinity is described in terms of the opertor norm of matrices, and it is optimal. We show that the when all the maps t sm(t) are linear, then x commutes with y. Several application to unitarily invariant norms in the unitary group are given. Then we extend these applications to Ad-invariant Finsler norms in the special unitary group of matrices. This last result is obtained by proving that any Ad-invariant Finsler norm in a compact semi-simple Lie group K is the supremum of a family of what we call orbit norms, induced by the Killing form of K.