Let (Pn) be a sequence of polynomials which converges with a geometric rate on some arc in the complex
plane to an analytic function. It is shown that if the sequence has restricted growth on a closed plane
set E which is non-thin at ∞, then the limit function has a maximal domain of existence, and (Pn)
converges with a locally geometric rate on this domain. If (snk) is a sequence of partial sums of a power
series, a similar growth restriction on E forces the power series to have Ostrowski gaps. Moreover, the
requirement of non-thinness of E at ∞ is necessary for these conclusions.