Asymptotic estimates on the von Neumann inequality for homogeneous polynomials

Abstract

By the von Neumann inequality for homogeneous polynomials there exists a positive constant Ck,q(n) such that for every k-homogeneous polynomial p in n variables and every n-tuple of commuting operators (T1, …, Tn) with Σi=1n Ti q ≤ 1 we have \[ \|p(T1, …, Tn)\| L( H) ≤ Ck,q(n) \; \ |p(z1, …, zn)| : Σi=1n zi q ≤ 1 \\,. \] For fixed k and q, we study the asymptotic growth of the smallest constant Ck,q(n) as n (the number of variables/operators) tends to infinity. For q = ∞, we obtain the correct asymptotic behavior of this constant (answering a question posed by Dixon in the seventies). For 2 ≤ q < ∞ we improve some lower bounds given by Mantero and Tonge, and prove the asymptotic behavior up to a logarithmic factor. To achieve this we provide estimates of the norm of homogeneous unimodular Steiner polynomials, i.e. polynomials such that the multi-indices corresponding to the nonzero coefficients form partial Steiner systems.