On symmetricity of the norm derivatives orthogonality in operator spaces

Souvik Ghosh; Kallol Paul; Debmalya Sain

Paper

On symmetricity of the norm derivatives orthogonality in operator spaces

Abstract

We investigate

-orthogonality and its local symmetry in the space of bounded linear operators. A characterization of Hilbert space operators with symmetric numerical range is established in terms of

-orthogonality. Further, we provide characterizations of

-left and

-right symmetric operators on finite-dimensional Hilbert spaces. In the two-dimensional real case, we show that the only nonzero

-left (or

-right) symmetric operators are scalar multiples of orthogonal matrices. However, in any finite-dimensional Hilbert space of dimension greater than two, an operator is

-left (or

-right) symmetric if and only if it is the zero operator. For infinite-dimensional spaces, we show that within a large class of operators, the zero operator remains the only example of

-left and

-right symmetric operators.