Norm attaining operators which satisfy a Bollob\'as type theorem

Abstract

In this paper, we are interested in studying the set A\|·\|(X, Y) of all norm-attaining operators T from X into Y satisfying the following: given ε>0, there exists η such that if \|Tx\| > 1 - η, then there is x0 such that \| x0 - x\| < ε and T itself attains its norm at x0. We show that every norm one functional on c0 which attains its norm belongs to A\|·\|(c0, K). Also, we prove that the analogous result holds neither for A\|·\|(1, K) nor A\|·\|(∞, K). Under some assumptions, we show that the sphere of the compact operators belongs to A\|·\|(X, Y) and that this is no longer true when some of these hypotheses are dropped. The analogous set Anu(X) for numerical radius of an operator instead of its norm is also defined and studied. We present a complete characterization for the diagonal operators which belong to the sets A\| · \|(X, X) and Anu(X) when X=c0 or p. As a consequence, we get that the canonical projections PN on these spaces belong to our sets. We give examples of operators on infinite dimensional Banach spaces which belong to A\| · \|(X, X) but not to Anu(X) and vice-versa. Finally, we establish some techniques which allow us to connect both sets by using direct sums.