Ando dilations, von Neumann inequality, and distinguished varieties

Abstract

Let D denote the unit disc in the complex plane C and let D2 = D × D be the unit bidisc in C2. Let (T1, T2) be a pair of commuting contractions on a Hilbert space H. Let dim ran(IH - Tj Tj*) < ∞, j = 1, 2, and let T1 be a pure contraction. Then there exists a variety V ⊂eq D2 such that for any polynomial p ∈ C[z1, z2], the inequality \[ \|p(T1,T2)\|B(H) ≤ \|p\|V \] holds. If, in addition, T2 is pure, then \[V = \(z1, z2) ∈ D2: ((z1) - z2 ICn) = 0\\]is a distinguished variety, where is a matrix-valued analytic function on D that is unitary on ∂ D. Our results comprise a new proof, as well as a generalization, of Agler and McCarthy's sharper von Neumann inequality for pairs of commuting and strictly contractive matrices.