Pluripolar set

In mathematics, in the area of potential theory, a pluripolar set is the analog of a polar set for plurisubharmonic functions.

Definition

Let $G\subset {\mathbb {C} }^{n}$ and let $f\colon G\to {\mathbb {R} }\cup \{-\infty \}$ be a plurisubharmonic function which is not identically $-\infty$ . The set

{\mathcal {P}}:=\{z\in G\mid f(z)=-\infty \}

is called a complete pluripolar set. A pluripolar set is any subset of a complete pluripolar set. Pluripolar sets are of Hausdorff dimension at most $2n-2$ and have zero Lebesgue measure.[1]

If $f$ is a holomorphic function then $\log |f|$ is a plurisubharmonic function. The zero set of $f$ is then a pluripolar set.

gollark: PotatOS is very crashable.

gollark: NUFS, for New Unixy Filesystem.

gollark: So I could sort of do this.

gollark: jrengen: PotatOS actually has support for virtual files.

gollark: Evil idea: make it have a prime *so big* it can only be factorized using bignums.

References

Sibony, Nessim; Schleicher, Dierk; Cuong, Dinh Tien; Brunella, Marco; Bedford, Eric; Abate, Marco (2010). Gentili, Graziano; Patrizio, Giorgio; Guenot, Jacques (eds.). Holomorphic Dynamical Systems: Lectures given at the C.I.M.E. Summer School held in Cetraro, Italy, July 7-12, 2008. Springer Science & Business Media. p. 275. ISBN 978-3-642-13170-7.

Steven G. Krantz. Function Theory of Several Complex Variables, AMS Chelsea Publishing, Providence, Rhode Island, 1992.

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[Patrizio-1] Sibony, Nessim; Schleicher, Dierk; Cuong, Dinh Tien; Brunella, Marco; Bedford, Eric; Abate, Marco (2010). Gentili, Graziano; Patrizio, Giorgio; Guenot, Jacques (eds.). Holomorphic Dynamical Systems: Lectures given at the C.I.M.E. Summer School held in Cetraro, Italy, July 7-12, 2008. Springer Science & Business Media. p. 275. ISBN 978-3-642-13170-7.

Pluripolar set

Definition

See also

References