Commuting semigroups of holomorphic mappings
Abstract
Let S1=\Ft\t≥ 0 and S2=\Gt\t≥ 0 be two continuous semigroups of holomorphic self-mappings of the unit disk =\z:|z|<1\ generated by f and g, respectively. We present conditions on the behavior of f (or g) in a neighborhood of a fixed point of S1 (or S2), under which the commutativity of two elements, say, F1 and G1 of the semigroups implies that the semigroups commute, i.e., Ft Gs=Gs Ft for all s,t≥ 0. As an auxiliary result, we show that the existence of the (angular or unrestricted) n-th derivative of the generator f of a semigroup \Ft\t≥ 0 at a boundary null point of f implies that the corresponding derivatives of Ft, t≥ 0, also exist, and we obtain formulae connecting them for n=2,3.
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