On the unit sphere of positive operators
Abstract
Given a C*-algebra A, let S(A+) denote the set of those positive elements in the unit sphere of A. Let H1, H2, H3 and H4 be complex Hilbert spaces, where H3 and H4 are infinite-dimensional and separable. In this note we prove a variant of Tingley's problem by showing that every surjective isometry : S(B(H1)+) S(B(H2)+) or (respectively, : S(K(H3)+) S(K(H4)+)) admits a unique extension to a surjective complex linear isometry from B(H1) onto B(H2)) (respectively, from K(H3) onto B(H4)). This provides a positive answer to a conjecture posed by G. Nagy [Publ. Math. Debrecen, 2018].
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