I am reading the following lemma from Harary and Palmer, and I have trouble fully understanding it.
In this context, $T(x)=x\exp\left(\sum_{i\ge 1}\frac{1}{i}T(x^i)\right)$, and its radius of convergence is denoted as $\eta$.
I can follow the proof up to $b_0=\lim_{x\rightarrow \eta^-}T(x)$. However, I don't understand why this would guarantee the convergence of T(x) at $\eta$, since a power series is not necessarily continuous at its radius of convergence. Am I missing something simple? Any explanation is appreciated. Thank you!
