Are there always singularities at the edge of a disk of convergence?

complex-analysis sequences-and-series taylor-expansion convergence-divergence calculus

$f(x)=\sum x^n/e^{\sqrt n}$ has radius of convergence 1, and it and all its term-by-term derivatives converge everywhere on the unit circle. Basically, $e^{\sqrt n}$ goes to infinity faster than any polynomial but more slowly than any exponential.

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