Optimal growth of harmonic functions frequently hypercyclic for the partial differentiation operator
Abstract
We solve a problem posed by Blasco, Bonilla and Grosse-Erdmann in 2010 by constructing a harmonic function on RN, that is frequently hypercyclic with respect to the partial differentiation operator ∂/∂ xk and which has a minimal growth rate in terms of the average L2-norm on spheres of radius r>0 as r ∞.
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