Toeplitz Quantization and Convexity

Abstract

Let Tmf be the Toeplitz quantization of a real C∞ function defined on the sphere CP(1). Tmf is therefore a Hermitian matrix with spectrum λm= (λ0m,…,λmm). Schur's theorem says that the diagonal of a Hermitian matrix A that has the same spectrum of Tmf lies inside a finite dimensional convex set whose extreme points are \( λσ(0)m,…,λσ(m)m)\, where σ is any permutation of (m+1) elements. In this paper, we prove that these convex sets "converge" to a huge convex set in L2([0,1]) whose extreme points are f* φ, where f* is the decreasing rearrangement of f and φ ranges over the set of measure preserving transformations of the unit interval [0,1].