Mixed Bohr radius in several variables

Abstract

Let K(B_pn,B_qn) be the n-dimensional (p,q)-Bohr radius for holomorphic functions on Cn. That is, K(B_pn,B_qn) denotes the greatest constant r≥ 0 such that for every entire function f(z)=Σα cα zα in n-complex variables, we have the following (mixed) Bohr-type inequality z ∈ r · B_qn Σα | cα zα | ≤ z ∈ B_pn | f(z) |, where B_rn denotes the closed unit ball of the n-dimensional sequence space rn. For every 1 ≤ p, q ≤ ∞, we exhibit the exact asymptotic growth of the (p,q)-Bohr radius as n (the number of variables) goes to infinity.