6533b7d7fe1ef96bd12678c3

RESEARCH PRODUCT

Lengths of radii under conformal maps of the unit disc

Mario BonkZoltán M. Balogh

subject

CombinatoricsPhysicsPlane (geometry)Physical constantApplied MathematicsGeneral MathematicsExponentBoundary (topology)Interval (graph theory)Conformal mapConstant (mathematics)Unit (ring theory)

description

If E f ( R ) E_{f}(R) is the set of endpoints of radii which have length greater than or equal to R > 0 R>0 under a conformal map f f of the unit disc, then cap ⁡ E f ( R ) = O ( R − 1 / 2 ) \operatorname {cap} E_{f}(R)=O(R^{-1/2}) as R → ∞ R\to \infty for the logarithmic capacity of E f ( R ) E_{f}(R) . The exponent − 1 / 2 -1/2 is sharp.

yearjournalcountryeditionlanguage
1999-01-01Proceedings of the American Mathematical Society
https://doi.org/10.1090/s0002-9939-99-04565-7