There is no operatorwise version of the Bishop-Phelps-Bollob\'as property
Abstract
Given two real Banach spaces X and Y with dimensions greater than one, it is shown that there is a sequence \Tn\n∈ N of norm attaining norm-one operators from X to Y and a point x0∈ X with \|x0\|=1, such that \|Tn(x0)\| 1 but ∈fn ∈ N \dist (x0,\,\x∈ X: \|Tn(x)\|=\|x\|=1\)\ >0. This shows that a version of the Bishop-Phelps-Bollob\'as property in which the operator is not changed is possible only if one of the involved Banach spaces is one-dimensional.
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