Best approximations, distance formulas and orthogonality in C*-algebras

Abstract

For a unital C*-algebra A and a subspace B of A, a characterization for a best approximation to an element of A in B is obtained. As an application, a formula for the distance of an element of A from B has been obtained, when a best approximation of that element to B exists. Further, a characterization for Birkhoff-James orthogonality of an element of a Hilbert C*-module to a subspace is obtained.

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