Characterizing projections among positive operators in the unit sphere

Abstract

Let E and P be subsets of a Banach space X, and let us define the unit sphere around E in P as the set Sph(E;P) :=\ x∈ P : \|x-b\|=1 for all b∈ E \. Given a C*-algebra A, and a subset E⊂ A, we shall write Sph+ (E) or SphA+ (E) for the set Sph(E;S(A+)), where S(A+) stands for the set of all positive operators in the unit sphere of A. We prove that, for an arbitrary complex Hilbert space H, then a positive element a in the unit sphere of B(H) is a projection if and only if Sph+B(H) ( Sph+B(H)(\a\) ) =\a\. We also prove that the equivalence remains true when B(H) is replaced with an atomic von Neumann algebra or with K(H2), where H2 is an infinite-dimensional and separable complex Hilbert space. In the setting of compact operators we prove a stronger conclusion by showing that the identity Sph+K(H2) ( Sph+K(H2)(a) ) =\ b∈ S(K(H2)+) : \!\! arrayc s_K(H2) (a) ≤ s_K(H2) (b), and 1-r_B(H2)(a)≤ 1-r_B(H2)(b) array\!\! \, holds for every a in the unit sphere of K(H2)+, where r_B(H2)(a) and s_K(H2) (a) stand for the range and support projections of a in B(H2) and K(H2), respectively.