Conjugate norms in ℂⁿ and related geometrical problems

Baran Mirosław

  • Publisher: Instytut Matematyczny Polskiej Akademi Nauk(Warszawa), 1998

Abstract

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AbstractWe consider ℂⁿ as a normed space equipped with a complex norm F and we investigate some geometrical problems related with the notion of a conjugate norm F*. A crucial role in our considerations is played by the classical Shmul'yan theorem on exposed points in dual spaces. Many applications of this theorem are given for different problems including characterization of linear (biholomorphic) equivalence for a class of balls in ℂⁿ, calculation of the group of linear automorphisms (Section 4) and for problems related to the complex method of interpolation (Sections 5-7). The main result is an effective formula for interpolating norms for the couple (ℝⁿ ⊗̆ ℂ ,ℝⁿ ⊗̂ ℂ) (Section 5) and, more generally, for the couple (H ⊗̆ ℂ,H ⊗̂ ℂ), where H is a real Hilbert space. In Section 3 we present connections of conjugate norms with problems of pluripotential theory and approximation theory. Here a special role is played by a class of complex norms that are natural complexifications of norms in ℝⁿ. In Section 2 we consider some properties of such norms, in particular we prove an essential generalization of a result by Hahn and Pflug.CONTENTSIntroduction.........................................................................................................51. Conjugate norms in ℝⁿ..................................................................................102. Conjugate norms in ℂⁿ..................................................................................163. Extremal properties of norms F(f,·) in pluripotential theory............................294. Biholomorphic inequivalence of some convex circular domains....................355. The complex method of interpolation and conjugate norms in ℂⁿ.................436. On tensor products k and k ....................................547. The complex interpolation of a complexification of a real Hilbert space.........62References........................................................................................................651991 Mathematics Subject Classification: 32F05, 32M05, 41A17, 46B20, 46C99, 52A43.

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Baran Mirosław. Conjugate norms in ℂⁿ and related geometrical problems. Warszawa: Instytut Matematyczny Polskiej Akademi Nauk, 1998. <http://eudml.org/doc/271247>.

@book{BaranMirosław1998,
abstract = {AbstractWe consider ℂⁿ as a normed space equipped with a complex norm F and we investigate some geometrical problems related with the notion of a conjugate norm F*. A crucial role in our considerations is played by the classical Shmul'yan theorem on exposed points in dual spaces. Many applications of this theorem are given for different problems including characterization of linear (biholomorphic) equivalence for a class of balls in ℂⁿ, calculation of the group of linear automorphisms (Section 4) and for problems related to the complex method of interpolation (Sections 5-7). The main result is an effective formula for interpolating norms for the couple (ℝⁿ ⊗̆ ℂ ,ℝⁿ ⊗̂ ℂ) (Section 5) and, more generally, for the couple (H ⊗̆ ℂ,H ⊗̂ ℂ), where H is a real Hilbert space. In Section 3 we present connections of conjugate norms with problems of pluripotential theory and approximation theory. Here a special role is played by a class of complex norms that are natural complexifications of norms in ℝⁿ. In Section 2 we consider some properties of such norms, in particular we prove an essential generalization of a result by Hahn and Pflug.CONTENTSIntroduction.........................................................................................................51. Conjugate norms in ℝⁿ..................................................................................102. Conjugate norms in ℂⁿ..................................................................................163. Extremal properties of norms F(f,·) in pluripotential theory............................294. Biholomorphic inequivalence of some convex circular domains....................355. The complex method of interpolation and conjugate norms in ℂⁿ.................436. On tensor products $ℝⁿ ⊗ ℝ^\{k\}$ and $ℂⁿ ⊗ ℂ^\{k\}$....................................547. The complex interpolation of a complexification of a real Hilbert space.........62References........................................................................................................651991 Mathematics Subject Classification: 32F05, 32M05, 41A17, 46B20, 46C99, 52A43.},
author = {Baran Mirosław},
keywords = {exposed points; conjugate norms; complexifications; generalized Green function; convex domains; complex interpolation; Clarkson's inequalities; tensor product spaces},
language = {eng},
location = {Warszawa},
publisher = {Instytut Matematyczny Polskiej Akademi Nauk},
title = {Conjugate norms in ℂⁿ and related geometrical problems},
url = {http://eudml.org/doc/271247},
year = {1998},
}

TY - BOOK
AU - Baran Mirosław
TI - Conjugate norms in ℂⁿ and related geometrical problems
PY - 1998
CY - Warszawa
PB - Instytut Matematyczny Polskiej Akademi Nauk
AB - AbstractWe consider ℂⁿ as a normed space equipped with a complex norm F and we investigate some geometrical problems related with the notion of a conjugate norm F*. A crucial role in our considerations is played by the classical Shmul'yan theorem on exposed points in dual spaces. Many applications of this theorem are given for different problems including characterization of linear (biholomorphic) equivalence for a class of balls in ℂⁿ, calculation of the group of linear automorphisms (Section 4) and for problems related to the complex method of interpolation (Sections 5-7). The main result is an effective formula for interpolating norms for the couple (ℝⁿ ⊗̆ ℂ ,ℝⁿ ⊗̂ ℂ) (Section 5) and, more generally, for the couple (H ⊗̆ ℂ,H ⊗̂ ℂ), where H is a real Hilbert space. In Section 3 we present connections of conjugate norms with problems of pluripotential theory and approximation theory. Here a special role is played by a class of complex norms that are natural complexifications of norms in ℝⁿ. In Section 2 we consider some properties of such norms, in particular we prove an essential generalization of a result by Hahn and Pflug.CONTENTSIntroduction.........................................................................................................51. Conjugate norms in ℝⁿ..................................................................................102. Conjugate norms in ℂⁿ..................................................................................163. Extremal properties of norms F(f,·) in pluripotential theory............................294. Biholomorphic inequivalence of some convex circular domains....................355. The complex method of interpolation and conjugate norms in ℂⁿ.................436. On tensor products $ℝⁿ ⊗ ℝ^{k}$ and $ℂⁿ ⊗ ℂ^{k}$....................................547. The complex interpolation of a complexification of a real Hilbert space.........62References........................................................................................................651991 Mathematics Subject Classification: 32F05, 32M05, 41A17, 46B20, 46C99, 52A43.
LA - eng
KW - exposed points; conjugate norms; complexifications; generalized Green function; convex domains; complex interpolation; Clarkson's inequalities; tensor product spaces
UR - http://eudml.org/doc/271247
ER -

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