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DUALITY FOR SOME LARGE SPACES OF ANALYTIC FUNCTIONS

Published online by Cambridge University Press:  20 January 2009

H. Jarchow
Affiliation:
Institut für Mathematik, Universität Zürich, Winterthurerstr. 190, CH 8057 Zürich, Switzerland ([email protected])
V. Montesinos
Affiliation:
Departamento de Matematica Aplicada, ETSI Telecomunicacion, Universidad Politecnica de Valencia, C/vera, s/n., E-46071 Valencia, Spain ([email protected])
K. J. Wirths
Affiliation:
Institut für Analysis, TU-Braunschweig, Pockelsstr. 14, D-38106 Braunschweig, Germany ([email protected])
J. Xiao
Affiliation:
Department of Mathematics and Statistics, Concordia University, 1455 de Maisonneue Blvd West, Montreal, Quebec, Canada H3G 1M8 ([email protected]) Department of Mathematics, Peking University, Beijing 100871, People's Republic of China
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Abstract

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We characterize the duals and biduals of the $L^p$-analogues $\mathcal{N}_\alpha^p$ of the standard Nevanlinna classes $\mathcal{N}_\alpha$, $\alpha\ge-1$ and $1\le p\lt \infty$. We adopt the convention to take $\mathcal{N}_{-1}^p$ to be the classical Smirnov class $\mathcal{N}^+$ for $p=1$, and the Hardy–Orlicz space $LH^p$ $(=(\text{Log}^+H)^p)$ for $1\lt p\lt\infty$. Our results generalize and unify earlier characterizations obtained by Eoff for $\alpha=0$ and $\alpha=-1$, and by Yanigahara for the Smirnov class.

Each $\mathcal{N}_\alpha^p$ is a complete metrizable topological vector space (in fact, even an algebra); it fails to be locally bounded and locally convex but admits a separating dual. Its bidual will be identified with a specific nuclear power series space of finite type; this turns out to be the ‘Fréchet envelope’ of $\mathcal{N}_\alpha^p$ as well.

The generating sequence of this power series space is of the form $(n^\theta)_{n\in\mathbb{N}}$ for some $0\lt\theta\lt1$. For example, the $\theta$s in the interval $(\smfr12,1)$ correspond in a bijective fashion to the Nevanlinna classes $\mathcal{N}_\alpha$, $\alpha\gt-1$, whereas the $\theta$s in the interval $(0,\smfr12)$ correspond bijectively to the Hardy–Orlicz spaces $LH^p$, $1\lt p\lt \infty$. By the work of Yanagihara, $\theta=\smfr12$ corresponds to $\mathcal{N}^+$.

As in the work by Yanagihara, we derive our results from characterizations of coefficient multipliers from $\mathcal{N}_\alpha^p$ into various smaller classical spaces of analytic functions on $\Delta$.

AMS 2000 Mathematics subject classification: Primary 46E10; 46A11; 47B38. Secondary 30D55; 46A45; 46E15\vskip-3pt

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2001