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Biholomorphic Mappings on Banach Spaces

Part of: Measures, integration, derivative, holomorphy General theory of linear operators

Published online by Cambridge University Press:  27 February 2019

H. Carrión ,
P. Galindo  and
M. L. Lourenço
H. Carrión
Affiliation:
Departamento de Matemática, Instituto de Matemática e Estatística, Universidade de São Paulo, Caixa Postal 66281, CEP: 05315-970, São Paulo, Brazil ([email protected]; [email protected])
P. Galindo
Affiliation:
Departamento de Análisis Matemático, Facultad de Matemáticas, Universidad de Valencia 46.100, Burjasot-Valencia, Spain ([email protected])
M. L. Lourenço
Affiliation:
Departamento de Matemática, Instituto de Matemática e Estatística, Universidade de São Paulo, Caixa Postal 66281, CEP: 05315-970, São Paulo, Brazil ([email protected]; [email protected])
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Abstract

We present an infinite-dimensional version of Cartan's theorem concerning the existence of a holomorphic inverse of a given holomorphic self-map of a bounded convex open subset of a dual Banach space. No separability is assumed, contrary to previous analogous results. The main assumption is that the derivative operator is power bounded, and which we, in turn, show to be diagonalizable in some cases, like the separable Hilbert space.

Keywords

automorphismbiholomorphic mappingpower-bounded operator

MSC classification

Primary: 46G20: Infinite-dimensional holomorphy 47A05: General (adjoints, conjugates, products, inverses, domains, ranges, etc.)
Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 62 , Issue 4 , November 2019 , pp. 913 - 924
Copyright
Copyright © Edinburgh Mathematical Society 2019 

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References

1Apostol, C. and Salinas, N., Nilpotent approximations and quasinilpotent operators, Pacific J. Math. 61(2) (1975), 327337.Google Scholar
2Carrión, H., Galindo, P. and Lourenço, M. L., Biholomorphic functions in dual Banach spaces, Complex Anal. Oper. Theory 7 (2013), 107114.Google Scholar
3Cima, J. A., Graham, I., Kim, K. T. and Krantz, S. G., The Caratheodory–Cartan–Kaup–Wu theorem on an infinite dimensional Hilbert space, Nagoya Math. J. 185 (2007), 1730.Google Scholar
4Conway, J. B., A course in functional analysis, Graduate Texts in Mathematics, Volume 96 (Springer, 1990).Google Scholar
5Dineen, S., Complex analysis on infinite dimensional spaces (Springer Verlag, 1999).Google Scholar
6Goebel, K. and Reich, S., Uniform convexity, hyperbolic geometry, and nonexpansive mappings, Monographs and Textbooks in Pure and Applied Mathematics, Volume 83 (Marcel Dekker, New York–Basel, 1984).Google Scholar
7Greene, R. and Krantz, S., Characterization of complex manifolds by the isotropy subgroups of their automorphism groups, Indiana Univ. Math. J. 34(4) (1985), 865879.Google Scholar
8Herrero, A. D., Most quasitriangular operators are triangular, most biquasitriangular operators are bitriangular, J. Operator Theory 20 (1988), 251267.Google Scholar
9Herrero, A. D., Approximation of Hilbert space operators, Pitman Research Notes in Mathematics Series, Volume 224 (John Wiley and Sons, New York, 1989).Google Scholar
10Isidro, J. M. and Stachó, L., Holomorphic automorphism groups in Banach space: an elementary introduction, Mathematical Studies, Volume 105 (North-Holland, 1994).Google Scholar
11Kaup, W., A Riemann mapping theorem for bounded symmetric domains in complex Banach spaces, Math. Z. 183(4) (1983), 503529.Google Scholar
12Kaup, W., Hermitian Jordan triple systems and the automorphisms of bounded symmetric domains, in Non-associative algebra and its applications (Oviedo, 1993), Mathematics and Its Applications, Volume 303, pp. 204214 (Kluwer, Dordrecht, 1994).Google Scholar
13Krantz, S. G., Function theory of several complex variables (John Wiley and Sons, 1972).Google Scholar
14Lindenstrauss, J. and Tzafriri, J., Classical Banach spaces I and II (Springer Verlag, 1977).Google Scholar
15Mujica, J., Complex analysis in Banach spaces, Dover Books on Mathematics (Dover Publications, 2010).Google Scholar
16Nagy, B. de Sz., On uniformly bounded linear transformations in Hilbert space, Acta Univ. Szeged. Sect. Sci. Math. 11 (1947), 152157.Google Scholar
17Rudin, W., Functional analysis, 2nd edn (McGraw-Hill, 1991).Google Scholar
18Yi, J. J., Wang, R. and Wang, X., Extension of isometries between the unit spheres of complex $\ell ^p( \Gamma ) (p>1)$ spaces, Acta Math. Sci. 34B(5) (2014), 15401550.1)$+spaces,+Acta+Math.+Sci.+34B(5)+(2014),+1540–1550.>Google Scholar