Orthogonality preserving mappings on inner product C* -modules
Subject Areas : StatisticsAli Khalili Gholi Abad 1 , مریم امیاری 2
1 - Department of Mathematics, Mashhad Branch
Islamic Azad University, Mashhad, Iran
2 - Associate Professor, Department of Mathematics, Mashhad Branch, Islamic Azad University, Mashhad, Iran
Keywords: فضای A-مدول ضرب داخلی, نگاشت حافظ تعامد, تعامد,
Abstract :
Suppose that A is a C^*-algebra. We consider the class of A-linear mappins between two inner product A-modules such that for each two orthogonal vectors in the domain space their values are orthogonal in the target space. In this paper, we intend to determine A-linear mappings that preserve orthogonality. For this purpose, suppose that E and F are two inner product A-modules and A+ is the set of all positive elements of A. We show that an A-linear mapping T:E→F preserves orthogonality if and only if there exists a∈A+ such that ⟨Tx,Ty⟩= a^2 ⟨x,y⟩ for each x,y∈E. At first recall that two vector x,y∈E are ordinary orthogonal if ⟨x,y⟩=0 and then we introduce the notion of orthogonality in an inner product A-module in three ways and show that an A-linear mapping between two inner product A-modules preserves the ordinary orthogonality if and only if it preserves each one of the new orthogonality.
[1] Chmieli’nski, J., 2005. Linear mappings approximately preserving orthogonality, J. Math. Anal. Appl. 304, pp.158--169.
[2] Murphy, G. J., 1990. C*-algebras and operator theory, Academic Press Inc., Boston,MA.
[3] Lance, E. C., 1995. Hilbert C*-modules A Toolkit for Operator Algebraists, Cam-
bridge Univ. Press, Cambridge.
[4] Ilišević, D., and Turensk, A., 2008. Approximately orthogonality preserving mappings on C*-modules,
J. Math. Anal. Appl., 341(1), pp. 298--308.
