On the hyperbolic metric of certain domains
Abstract
We prove that if E is a compact subset of the unit disk D in the complex plane, if E contains a sequence of distinct points an= 0 for n≥ 1 such that n∞ an=0 and for all n we have |an+1| ≥ 12 |an| , and if G= D E is connected and 0∈ ∂ G, then there is a constant c>0 such that for all z∈ G we have λG (z) ≥ c/|z| where λG (z) is the density of the hyperbolic metric in G.
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