Kang-Tae Kim scite author profile

B × C n , we get the variation of domains D = T (B × D) where each domain D(t) := T (t, D) = D − at contains ζ 0 . Letting λ(t) = Λ(ζ 0 + at) denote the Robin constant for (D(t), ζ 0 ) and using (1.1) yields part of the following surprising result (cf., [20] and [9]). Theorem 1.1. Let D be a bounded pseudoconvex domain in C n with C ∞ boundary. Then log (−Λ(z)) and −Λ(z) are real-analytic, strictly plurisubharmonic exhaustion functions for D.We now study a generalization of the second variation formula (1.1) to complex manifolds M equipped with a Hermitian metric ds 2 and a smooth, nonnegative function c. Our purpose is that, with this added flexibility, we are able to give a criterion for a bounded, smoothly bounded, pseudoconvex domain D in a complex homogeneous space to be Stein. In particular, we are able to do the following:1. Describe concretely all the non-Stein pseudoconvex domains D in the complex torus of Grauert (section 5).2. Give a description of all the non-Stein pseudoconvex domains D in the special Hopf manifolds H n (section 6).3. Give a description of all the non-Stein pseudoconvex domains D in the complex flag spaces F n (section 7).4. Give another explanation as to why all pseudoconvex subdomains of complex projective space, or, more generally, of complex Grassmannian manifolds, are Stein (Appendix A).

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Domains in C n with a piecewise Levi flat boundary which possess a noncompact automorphism group

Kim

1992

Math. Ann.

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Kang-Tae Kim

The Geometry of Complex Domains

On the tangential holomorphic vector fields vanishing at an infinite type point

On the uniform squeezing property of bounded convex domains in ℂn

Robin functions for complex manifolds and applications

Domains in C n with a piecewise Levi flat boundary which possess a noncompact automorphism group

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