On Bhatia-Semrl Property, Strong Subdifferentiability and Essential Norm of Operators on Banach Spaces
Abstract
We investigate the interplay among three key properties of bounded linear operators between Banach spaces: the Bhatia-Semrl property, strong subdifferentiability and the condition that the essential norm is strictly less than the operator norm. For a Hilbert space H and for 1<p,q<∞, we show that for any operator in B(H) and B(p, q), the essential norm is strictly less than the operator norm if and only if it is the point of strong subdifferentiability of the norm and its norm-attainment set is compact. Moreover, for operators in these spaces that satisfy the Bhatia-Semrl property, we show that their essential norm must be strictly less than their operator norm. We also study norm one projections satisfying the Bhatia-Semrl property and provide examples of operators that possess this property.
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