Symmetrization and the rate of convergence of semigroups of holomorphic functions
Abstract
Let (φt), t 0, be a semigroup of holomorphic self-maps of the unit disk D. Let be its Koenigs domain and τ∈ ∂ D be its Denjoy-Wolff point. Suppose that 0∈ and let be the Steiner symmetrization of with respect to the real axis. Consider the semigroup (φt) with Koenigs domain and let τ be its Denjoy-Wolff point. We show that, up to a multiplicative constant, the rate of convergence of (φt) is slower than that of (φt); that is, for every t>0, |φt(0)-τ|≤ 4π\, |φt(0)-τ|. The main tool for the proof is the harmonic measure.
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