Characterizations of smooth spaces by *-orthogonality
Abstract
The aim of this paper is to present some results concerning the *-orthogonality in real normed spaces and its preservation by linear operators. Among other things, we prove that if T\,: X Y is a nonzero linear (I, *)-orthogonality preserving mapping between real normed spaces, then 13\|T\|\|x\|≤\|Tx\|≤ 3[T]\|x\|, (x∈ X) where [T]:=∈f\\|Tx\|: \,x∈ X, \|x\|=1\. We also show that the pair (X,_*) is an orthogonality space in the sense of R\"atz. Some characterizations of smooth spaces are given based on the *-orthogonality.
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