Mappings preserving approximate orthogonality in Hilbert C∗-modules
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Mohammad Sal Moslehian [1] ; Ali Zamani [2]
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[1] Ferdowsi University of Mashhad
Ferdowsi University of Mashhad
Irán
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[2] Farhangian University (Irán)
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- Localización: Mathematica scandinavica, ISSN 0025-5521, Vol. 122, Nº 2, 2018, págs. 257-276
- Idioma: inglés
- DOI: 10.7146/math.scand.a-102945
- Texto completo no disponible (Saber más ...)
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Resumen
We introduce a notion of approximate orthogonality preserving mappings between Hilbert C∗-modules. We define the concept of (δ,ε) -orthogonality preserving mapping and give some sufficient conditions for a linear mapping to be (δ,ε)-orthogonality preserving. In particular, if E is a full Hilbert A-module with K(H)⊆A⊆B(H) and T,S:E→E are two linear mappings satisfying |⟨Sx,Sy⟩|=∥S∥2|⟨x,y⟩| for all x,y∈E and ∥T−S∥≤θ∥S∥, then we show that T is a (δ,ε)-orthogonality preserving mapping. We also prove whenever K(H)⊆A⊆B(H) and T:E→F is a nonzero A-linear (δ,ε)-orthogonality preserving mapping between A-modules, then ∥∥⟨Tx,Ty⟩−∥T∥2⟨x,y⟩∥∥≤4(ε−δ)(1−δ)(1+ε)∥Tx∥∥Ty∥(x,y∈E).
As a result, we present some characterizations of the orthogonality preserving mappings
