The Additive Operator Preserving Birkhoff Orthogonal ()
Abstract
The Birkhoff orthogonal plays an important role in the geometric study of Banach spaces. It has been conrmed that a Birkhoff orthogonality preserving linear operator between two normed linear spaces must necessarily be a scalar multiple of a linear isometry. In this paper, the author gives a new result that a Birkhoff orthogonality preserving additive operator between two-dimensional normed linear spaces is necessarily a scalar multiple of a linear isometry.
Share and Cite:
Guo, S. (2019) The Additive Operator Preserving Birkhoff Orthogonal.
Journal of Applied Mathematics and Physics,
7, 505-512. doi:
10.4236/jamp.2019.73036.
Conflicts of Interest
The authors declare no conflicts of interest regarding the publication of this paper.
References
|
[1]
|
Amir, D. (1986) Characterizations of Inner Product Spaces. Birkhauser, Basel.
[CrossRef]
|
|
[2]
|
Alonso, J., Martini, H. and Wu, S. (2012) On Birkho Orthogonality and Isosceles Orthogonality in Normed Linear Spaces. Aequationes Mathematicae, 83, 153-189.
[CrossRef]
|
|
[3]
|
Torrance, E. (1970) Strictly Convex Spaces via Semi-Inner-Product Space Orthogonality, Proceedings of the American Mathematical Society, 47, 108-110.
[CrossRef]
|
|
[4]
|
James, R.C. (1935) Orthogonality in Normed Linear Spaces. Duke Mathematical Journal, 1, 169-172.
[CrossRef]
|
|
[5]
|
James, R.C. (1947) Inner Products in Normed Linear Spaces. Bulletin of the American Mathematical Society, 53, 559-566.
[CrossRef]
|
|
[6]
|
James, R.C. (1947) Orthogonality and Linear Functions in
Normed Linear Spaces. Transactions of the American Mathematical Society, 61, 265-292.
[CrossRef]
|
|
[7]
|
Koldobsky, A. (1993) Operators Preserving Orthogonality Are Isometries. Proceedings of the Royal Society of Edinburgh Section A, 123, 835-837.
[CrossRef]
|
|
[8]
|
Chmieli nski, J. (2005) Linear Mappings Approximately Preserving Orthogonality. Journal of Mathematical Analysis and Applications, 304, 158-169.
[CrossRef]
|
|
[9]
|
Blanco, A. and Turn sek, A. (2006) On Maps That Preserve Orthogonality in Normed Spaces. Proceedings of the Royal Society of Edinburgh Section A, 136, 709-716.
[CrossRef]
|
|
[10]
|
W ojcik, P. (2019) Mappings Preserving B-Orthogonality. Indagationes Mathematicae, 30, 197-200.
[CrossRef]
|
|
[11]
|
Kuczma, M. (2009) An Introduction to the Theory of functional Equations and Inequalities. Cauchy's Equation and Jensen's Inequality. Birkhauser, Basel.
[CrossRef]
|