Polya's shire theorem

In complex analysis in mathematics, Pólya's shire theorem, due to the mathematician George Pólya, describes the asymptotic distribution of the zeros of successive derivatives of a meromorphic function on the complex plane.^[1] It has applications in Nevanlinna theory.^[2]^:{{{1}}}

Statement

Let $f$ be a meromorphic function on the complex plane with $P \neq \emptyset$ as its set of poles. If $E$ is the set of all zeros of all the successive derivatives $f^{'}, f^{″}, f^{(3)}, \dots$ , then the derived set $E^{'}$ (or the set of all limit points) is as follows:

if $f$ has only one pole, then $E^{'}$ is empty.
if $| P | \geq 2$ , then $E^{'}$ coincides with the edges of the Voronoi diagram determined by the set of poles $P$ . In this case, if $a \in P$ , the interior of each Voronoi cell consisting of the points closest to $a$ than any other point in $P$ is called the $a$ -shire.^[3]

The derived set is independent of the order of each pole.^[3]^:{{{1}}}

References

↑ Pólya, George (1922). "Über die Nullstellen sukzessiver Derivierten". Math. Zeit. 12: 36–60. doi:10.1007/BF01482068.
↑ Hayman, W. (1964). "Distribution of the values of meromorphic functions and their derivatives". Meromorphic Functions. Oxford University Press. pp. 55–78. Search this book on
↑ ^3.0 ^3.1 Whittaker, J.M. (1935). Interpolatory Function Theory. Cambridge University Press. pp. 32–38. Search this book on

Rikard Bögvad, Christian Hägg, A refinement of Pólya's method to construct Voronoi diagrams for rational functions, https://arxiv.org/abs/1610.00921

Weiss, M. "Pólya's Shire Theorem for Automorphic Functions". Geometriae Dedicata 100, 85–92 (2003). https://doi.org/10.1023/A:1025855513977
Robert M. Gethner, A Pólya "shire" Theorem for Entire Functions. University of Wisconsin-Madison, (1982) https://www.google.com/books/edition/A_P%C3%B3lya_shire_Theorem_for_Entire_Functi/NmBxAAAAMAAJ

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[1] Pólya, George (1922). "Über die Nullstellen sukzessiver Derivierten". Math. Zeit. 12: 36–60. doi:10.1007/BF01482068.

[Hayman-2] Hayman, W. (1964). "Distribution of the values of meromorphic functions and their derivatives". Meromorphic Functions. Oxford University Press. pp. 55–78. Search this book on

[Whittaker-3] 3.0 ^3.1 Whittaker, J.M. (1935). Interpolatory Function Theory. Cambridge University Press. pp. 32–38. Search this book on

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Polya's shire theorem

Statement

References

Further reading