Norm Hilbert spaces over Krull valued fields

Ochsenius, H.

Pontificia Universidad Católica de Chile

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2024-04-17. Norm Hilbert spaces over Krull valued fields.pdf

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Ochsenius, H. Schikhof, W. H.

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Norm Hilbert spaces (NHS) are defined as Banach spaces over valued fields (see 1.4) for which each closed subspace has a norm-orthogonal complement. For fields with a rank I valuation, these spaces were characterized already in [10, 5.13, 5.16], where it was proved that infinite-dimensional NHS exist only if the valuation of K is discrete. The first discussion of the case of (Krull) valued fields appeared in [1] and [3]. In this paper we continue and expand this work focussing on the most interesting cases, not covered before. If K is not metrizable then each NHS is finite-dimensional (Corollary 3.2.2), but otherwise there do exist infinite-dimensional NHS; they are completely described in 3.2.5. Our main result is Theorem 3.2.1, where various characterizations of NI-IS of different nature are presented. Typical results are that NHS arc of countable type, that they have orthogonal bases, and that no subspace is linearly homeomorphic to co.

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Autor	Ochsenius, H. Schikhof, W. H.
Título	Norm Hilbert spaces over Krull valued fields
Revista	INDAGATIONES MATHEMATICAE-NEW SERIES
ISSN	0019-3577
ISSN electrónico	1872-6100
Volumen	17
Número de publicación	1
Página inicio	65
Página final	84
Fecha de publicación	2006
Resumen	Norm Hilbert spaces (NHS) are defined as Banach spaces over valued fields (see 1.4) for which each closed subspace has a norm-orthogonal complement. For fields with a rank I valuation, these spaces were characterized already in [10, 5.13, 5.16], where it was proved that infinite-dimensional NHS exist only if the valuation of K is discrete. The first discussion of the case of (Krull) valued fields appeared in [1] and [3]. In this paper we continue and expand this work focussing on the most interesting cases, not covered before. If K is not metrizable then each NHS is finite-dimensional (Corollary 3.2.2), but otherwise there do exist infinite-dimensional NHS; they are completely described in 3.2.5. Our main result is Theorem 3.2.1, where various characterizations of NI-IS of different nature are presented. Typical results are that NHS arc of countable type, that they have orthogonal bases, and that no subspace is linearly homeomorphic to co.
Derechos	acceso restringido
DOI	10.1016/S0019-3577(06)80007-8
Editorial	ELSEVIER SCIENCE BV
Enlace	https://doi.org/10.1016/S0019-3577(06)80007-8 https://repositorio.uc.cl/handle/11534/77366
Id de publicación en WoS	WOS:000237521900006
Paginación	20 páginas
Palabra clave	Lipschitz operators Hilbert spaces Krull valued fields
Tema ODS	04 Quality Education
Tema ODS español	04 Educación y calidad
Tipo de documento	artículo