Landau's constants

In complex analysis, a branch of mathematics, Landau's constants (Edmund Landau 1929) are certain mathematical constants that describe the behaviour of holomorphic functions defined on the unit disk. Consider the set F of all those holomorphic functions f on the unit disk for which

f'(0)=1.\,

We define L_f to be the radius of the largest disk contained in the image of f, and B_f to be the radius of the largest disk that is the biholomorphic image of a subset of a unit disk.

Landau's constants are then defined as the infimum of L_f or B_f, where f is any holomorphic function or any injective holomorphic function on the unit disk with

f'(0)=1.\,

The three resulting constants are abbreviated L, B, and A (for injective functions), respectively.

The exact values of L, B, and A are not known, but it is known that

0.4330+10^{{-14}}<B<0.472\,\!

0.5<L\leq 0.543258965342...\,\!

(sequence A081760 in the OEIS)

0.5 < A \le 0.7853

References

Landau, Edmund (1929), "Über die Blochsche Konstante und zwei verwandte Weltkonstanten", Mathematische Zeitschrift, 30 (1), doi:10.1007/BF01187791

External links

Weisstein, Eric W. "Landau Constant". MathWorld.

This article is issued from Wikipedia - version of the 9/3/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.

Landau's constants

See also

References

External links