The Karpelevic Region Revisited

Abstract

We consider the Karpelevic region n ⊂ C consisting of all eigenvalues of all stochastic matrices of order n. We provide an alternative characterisation of n that sharpens the original description given by Karpelevic. In particular, for each θ ∈ [0, 2π), we identify the point on the boundary of n with argument θ. We further prove that if n ∈ N with n 2, and t ∈ n, then t is a subdominant eigenvalue of some stochastic matrix of order n.