Birkhoff--James orthogonality of operators in semi-Hilbertian spaces and its applications

Abstract

In this paper, the concept of Birkhoff--James orthogonality of operators on a Hilbert space is generalized when a semi-inner product is considered. More precisely, for linear operators T and S on a complex Hilbert space H, a new relation TBA S is defined if T and S are bounded with respect to the seminorm induced by a positive operator A satisfying \|T + γ S\|A≥ \|T\|A for all γ ∈ C. We extend a theorem due to R. Bhatia and P. Semrl, by proving that TBA S if and only if there exists a sequence of A-unit vectors \xn\ in H such that n→ +∞\|Txn\|A = \|T\|A and n→ +∞ Txn, SxnA = 0. In addition, we give some A-distance formulas. Particularly, we prove align* ∈fγ ∈ C\|T + γ S\|A = \| Tx, yA|; \, \|x\|A = \|y\|A = 1, \, Sx, yA = 0\. align* Some other related results are also discussed.