Intersections of several disks of the Riemann sphere as K-spectral sets

Abstract

We prove that if n closed disks D1, D2, ..., Dn, of the Riemann sphere are spectral sets for a bounded linear operator A on a Hilbert space, then their intersection D1 D2... Dn is a complete K-spectral set for A, with K≤ n+n(n-1)/3. When n=2 and the intersection X1 X2 is an annulus, this result gives a positive answer to a question of A.L. Shields (1974).