PlanetMath: Levi pseudoconvex

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Levi pseudoconvex

(Definition)

Let $G \subset {\mathbb{C}}^n$ be a domain (open connected subset) with boundary, that is the boundary is locally the graph of a twice continuously differentiable function. Let $\rho \colon {\mathbb{C}}^n \to {\mathbb{R}}$ be a defining function of , that is $\rho$ is a twice continuously differentiable function such that $\operatorname{grad} \rho (z) \not= 0$ for $z \in \partial G$ and $G = \{ z \in {\mathbb{C}}^n \mid \rho(z) < 0 \}$ (such a function always exists).

Definition 1 Let $p \in \partial G$ (boundary of

). We call the space of vectors $w = (w_1,\ldots,w_n) \in {\mathbb{C}}^n$ such that

$\displaystyle \sum_{k=1}^n \frac{\partial \rho}{\partial z_k} (p) w_k = 0 ,$

the space of holomorphic tangent vectors at

and denote it $T^{1,0}_p(\partial G)$ .

$T^{1,0}_p(\partial G)$ is an dimensional complex vector space and is a subspace of the complexified real tangent space, that is ${\mathbb{C}} \otimes_{\mathbb{R}} T_p(\partial G)$ .

Note that when then the complex tangent space contains just the zero vector.

Definition 2 The point $p \in \partial G$ is called Levi pseudoconvex (or just pseudoconvex) if

$\displaystyle \sum_{j,k=1}^n \frac{\partial^2 \rho}{\partial z_j \partial \bar{z}_k} (p) w_j \bar{w}_k \geq 0 ,$

for all $w \in T^{1,0}_p(\partial G)$ . The point is called strongly Levi pseudoconvex (or just strongly pseudoconvex or also strictly pseudoconvex) if the inequality above is strict. The expression on the left is called the Levi form.

Note that if a point is not strongly Levi pseudoconvex then it is sometimes called a weakly Levi pseudoconvex point.

The Levi form really acts on an dimensional space, so the expression above may be confusing as it only acts on $T^{1,0}_p(\partial G)$ and not on all of ${\mathbb{C}}^n$ .

Definition 3 The domain

is called Levi pseudoconvex if every boundary point is Levi pseudoconvex. Similarly

is called strongly Levi pseudoconvex if every boundary point is strongly Levi pseudoconvex.

Note that in particular all convex domains are pseudoconvex.

It turns out that with boundary is a domain of holomorphy if and only if is Levi pseudoconvex.

Bibliography

1: M. Salah Baouendi, Peter Ebenfelt, Linda Preiss Rothschild. Real Submanifolds in Complex Space and Their Mappings, Princeton University Press, Princeton, New Jersey, 1999.
2: Steven G. Krantz. Function Theory of Several Complex Variables, AMS Chelsea Publishing, Providence, Rhode Island, 1992.

"Levi pseudoconvex" is owned by jirka.

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Also defines:

Levi form, strongly Levi pseudoconvex, strongly pseudoconvex, strictly pseudoconvex, weakly pseudoconvex, weakly Levi pseudoconvex, holomorphic tangent vector

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Cross-references: domain of holomorphy, convex, domain, acts on, expression, strict, inequality, pseudoconvex, point, zero vector, contains, complex tangent space, subspace, vector space, complex, vectors, function, continuously differentiable, graph, boundary, subset, connected, open
There are 7 references to this entry.

This is version 7 of Levi pseudoconvex, born on 2004-07-29, modified 2007-02-23.
Object id is 6048, canonical name is LeviPseudoconvex.
Accessed 5962 times total.

Classification:

AMS MSC:	32T05 (Several complex variables and analytic spaces :: Pseudoconvex domains :: Domains of holomorphy)
	32T15 (Several complex variables and analytic spaces :: Pseudoconvex domains :: Strongly pseudoconvex domains)

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