On the Interpolation of Analytic Maps
Abstract
Let (E0,E1) and (H0,H1) be a pair of Banach spaces with dense and continuous embeddings E1 into E0, H1 into H0. For θ ∈ [0,1] denote by Bθ(0,R) the ball of radius R centered at zero in the interpolation spaces Eθ. Assume that an analytic map maps the ball B0(0,R) into H0, maps B1(0,R) into H1 and for θ =0,1 the estimates \|(x)\|Hθ Cθ\|x\|Hθ, ∀\ x∈ Bθ(0,R), hold. Then for all θ∈(0, 1) and r<R maps the ball Bθ (0,r) into Hθ and the same estimate holds for x∈ Bθ(0,r) if the constant Cθ is replaced by C01-θC1θ R/(R-r).
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