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RETRACTED – The wigner property for CL-spaces and finite-dimensional polyhedral banach spaces
Published online by Cambridge University Press: 04 June 2021
Abstract
We say that a map $f$
from a Banach space $X$
to another Banach space $Y$
is a phase-isometry if the equality\[ \{\|f(x)+f(y)\|, \|f(x)-f(y)\|\}=\{\|x+y\|, \|x-y\|\} \]holds for all $x,\,y\in X$
. A Banach space $X$
is said to have the Wigner property if for any Banach space $Y$
and every surjective phase-isometry $f : X\rightarrow Y$
, there exists a phase function $\varepsilon : X \rightarrow \{-1,\,1\}$
such that $\varepsilon \cdot f$
is a linear isometry. We present some basic properties of phase-isometries between two real Banach spaces. These enable us to show that all finite-dimensional polyhedral Banach spaces and CL-spaces possess the Wigner property.
MSC classification
Secondary:
46B04: Isometric theory of Banach spaces
Information
- Type
- Research Article
- Information
- Proceedings of the Edinburgh Mathematical Society , Volume 64 , Issue 3 , August 2021 , pp. 717 - 733
- Copyright
- Copyright © The Author(s), 2021. Published by Cambridge University Press on Behalf of The Edinburgh Mathematical Society
References
Cheng, L. X. and Li, M., Extreme points exposed points differentiability points in CL-spaces, Proc. Amer. Math. Soc. 136(7) (2008), 2445–2451.CrossRefGoogle Scholar
Chevalier, G., Wigner's theorem and its generalizations, in Handbook of quantum logic and quantum structures, pp. 429–475 (Elsevier Sci. B. V., Amsterdam, 2007).CrossRefGoogle Scholar
Fullerton, R. E., Geometrical characterization of certain function spaces, in Proc. Inter. Sympos. Linear Spaces, pp. 227–236, 1960 (Jerusalem Academic Press/Pergamon, Jerusalem/Oxford, 1961).Google Scholar
Gehér, Gy. P., An elementary proof for the non-bijective version of Wigner's theorem, Phys. Lett. A 378 (2014), 2054–2057.10.1016/j.physleta.2014.05.039CrossRefGoogle Scholar
Györy, M., A new proof of Wigner's theorem, Rep. Math. Phys. 54 (2004), 159–167.CrossRefGoogle Scholar
Hansen, A. B. and Lima, Å., The structure of finite dimensional Banach spaces with the 3.2 intersection property, Acta Math. 146 (1981), 1–23.CrossRefGoogle Scholar
Holmes, R. B., Geometric Functional Analysis and its Applications (New York, NY, Springer-Verlag, 1975).10.1007/978-1-4684-9369-6CrossRefGoogle Scholar
Huang, X. and Tan, D., Wigner's theorem in atomic $L_p$
-spaces $(p>0)$, Publ. Math. Debrecen 92(34) (2018), 411–418.0)$' href=https://dx.doi.org/10.5486/PMD.2018.8005>CrossRef0)$' href=https://scholar.google.com/scholar_lookup?title=Wigner's+theorem+in+atomic+%24L_p%24-spaces+%24(p%3E0)%24&author=Huang+X.&author=Tan+D.&publication+year=2018&journal=Publ.+Math.+Debrecen&volume=92&doi=10.5486%2FPMD.2018.8005&pages=411-418>Google Scholar
-spaces $(p>0)$
, Publ. Math. Debrecen 92(34) (2018), 411–418.0)$' href=https://dx.doi.org/10.5486/PMD.2018.8005>CrossRef0)$' href=https://scholar.google.com/scholar_lookup?title=Wigner's+theorem+in+atomic+%24L_p%24-spaces+%24(p%3E0)%24&author=Huang+X.&author=Tan+D.&publication+year=2018&journal=Publ.+Math.+Debrecen&volume=92&doi=10.5486%2FPMD.2018.8005&pages=411-418>Google ScholarJia, W. and Tan, D., Wigner's theorem in $\mathcal {L}^{\infty }(\Gamma )$-type spaces, Bull. Austral. Math. Soc. 97(2) (2018), 279–284.CrossRefGoogle Scholar
-type spaces, Bull. Austral. Math. Soc. 97(2) (2018), 279–284.CrossRefGoogle ScholarLima, Å., Intersection properties of balls and subspaces in Banach spaces, Trans. Amer. Math. Soc. 227 (1977), 1–62.CrossRefGoogle Scholar
López, G., Martín, M. and Payá, R., Real Banach spaces with numerical index 1, Bull. London Math. Soc. 31 (1999), 207–212.CrossRefGoogle Scholar
Maksa, G. and Páles, Z., Wigner's theorem revisited, Publ. Math. Debrecen 81(12) (2012), 243–249.CrossRefGoogle Scholar
Mankiewicz, P., On extension of isometries in normed linear spaces, Bull. Acad. Polon, Sci. Set. Sci. Math. Astronomy, Phys. 20 (1972), 367–371.Google Scholar
Martín, M., Banach spaces having the Radon-Nikodým property and numerical index 1, Proc. Amer. Math. Soc. 131 (2003), 3407–3410.10.1090/S0002-9939-03-07176-4CrossRefGoogle Scholar
Martín, M. and Payá, R., On CL-spaces and almost CL-spaces, Ark. Mat. 42 (2004), 107–118.CrossRefGoogle Scholar
Mazur, S. and Ulam, S., Surles transformationes isométriques despaces vectoriels normés, C. R. Math. Acad. Sci. Paris 194 (1932), 946–948.Google Scholar
Molnár, L., Orthogonality preserving transformations on indefinite inner product spaces: generalization of Uhlhorn's version of Wigner's theorem, J. Funct. Anal. 194(2) (2002), 248–262.10.1006/jfan.2002.3970CrossRefGoogle Scholar
Mori, M., Tingley's problem through the facial structure of operator algebras, J. Math. Anal. Appl. 466(2) (2018), 1281–1298.10.1016/j.jmaa.2018.06.050CrossRefGoogle Scholar
Rätz, J., On Wigner's theorem: remarks, complements, comments, and corollaries, Aequationes Math. 52(1-2) (1996), 1–9.CrossRefGoogle Scholar
Reisner, S., Certain Banach spaces associated with graphs and CL-spaces with 1-unconditonal bases, J. London Math. Soc. (2) 43 (1991), 137–148.10.1112/jlms/s2-43.1.137CrossRefGoogle Scholar
Tan, D. and Huang, X., Phase-isometries on real normed spaces, J. Math. Anal. Appl. 488(1) (2020), 124058.10.1016/j.jmaa.2020.124058CrossRefGoogle Scholar
Tan, D., Huang, X. and Liu, R., Generalized-lush spaces and the Mazur-Ulam property, Studia Math. 219(2) (2013), 139–153.CrossRefGoogle Scholar
Tan, D. and Liu, R., A note on The Mazur-Ulam property of almost-CL-spaces, J. Math. Anal. Appl. 405 (2013), 336–341.CrossRefGoogle Scholar
Tanaka, R., A further property of spherical isometries, Bull. Austral. Math. Soc. 90(2) (2014), 304–310.CrossRefGoogle Scholar
Wigner, E., Gruppentheorie und ihre Anwendung auf die Quantenmechanik der Atomsprekten, (Braunschweig, Vieweg, 1931).CrossRefGoogle Scholar
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