0000000000291604

AUTHOR

Mario Bonk

showing 2 related works from this author

Lengths of radii under conformal maps of the unit disc

1999

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.

CombinatoricsPhysicsPlane (geometry)Physical constantApplied MathematicsGeneral MathematicsExponentBoundary (topology)Interval (graph theory)Conformal mapConstant (mathematics)Unit (ring theory)Proceedings of the American Mathematical Society
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Conformal Metrics on the Unit Ball in Euclidean Space

1998

Unit sphereEuclidean spaceGeneral MathematicsMathematical analysisConformal mapMathematicsProceedings of the London Mathematical Society
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