We introduce and characterize interpolation sets in a weak sense for the Lipschitz class in the unit disc of the complex plane. Interpolation sets in the classical sense and in a strong sense for this space have already been examined.
This paper is devoted to pose several interpolation problems on the open unit disk 𝔻 of the complex plane in a recursive and linear way. We look for interpolating sequences (zn) in 𝔻 so that given a bounded sequence (an) and a suitable sequence (wn), there is a bounded analytic function f on 𝔻 such that f(z1) = w1 and f(zn+1) = anf(zn) + wn+1. We add a recursion for the derivative of the type: f′(z1) = $\begin{array}{}
w_1'
\end{array} $ and f′(zn+1) = $\begin{array}{}
a_n'
\end{array} $ [(1 − |zn|2)/(1 − |zn+1|2)] f′(zn) + $\begin{array}{}
w_{n+1}',
\end{array} $ where ($\begin{array}{}
a_n'
\end{array} $) is bounded and ($\begin{array}{}
w_n'
\end{array} $) is an appropriate sequence, and we also look for zero-sequences verifying the recursion for f′. The conditions on these interpolating sequences involve the Blaschke product with zeros at their points, one of them being the uniform separation condition.
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