A characterization of a local vector valued Bollob\'as theorem

Abstract

In this paper, we are interested in giving two characterizations for the so-called property Lo,o, a local vector valued Bollob\'as type theorem. We say that (X, Y) has this property whenever given > 0 and an operador T: X → Y, there is η = η(, T) such that if x satisfies \|T(x)\| > 1 - η, then there exists x0 ∈ SX such that x0 ≈ x and T itself attains its norm at x0. This can be seen as a strong (although local) Bollob\'as theorem for operators. We prove that the pair (X, Y) has the Lo,o for compact operators if and only if so does (X, ) for linear functionals. This generalizes at once some results due to D. Sain and J. Talponen. Moreover, we present a complete characterization for when (X Y, ) satisfies the Lo,o for linear functionals under strict convexity or Kadec-Klee property assumptions in one of the spaces. As a consequence, we generalize some results in the literature related to the strongly subdifferentiability of the projective tensor product and show that (Lp(μ) × Lq(); ) cannot satisfy the Lo,o for bilinear forms.