Intrinsic geometry and boundary structure of plane domains

Abstract

For a non-empty compact set E in a proper subdomain of the complex plane, we denote the diameter of E and the distance from E to the boundary of by d(E) and d(E,∂), respectively. The quantity d(E)/d(E,∂) is invariant under similarities and plays an important role in Geometric Function Theory. In the present paper, when has the hyperbolic distance h(z,w), we consider the infimum () of the quantity h(E)/(1+d(E)/d(E,∂)) over compact subsets E of with at least two points, where h(E) stands for the hyperbolic diameter of the set E. We denote the upper half-plane by H. Our main results claim that () is positive if and only if the boundary of is uniformly perfect and that the inequality ()≤(H) holds for all , where equality holds precisely when is convex.