中文

On weak convergence in K\"{o}the-Bochner function spaces

泛函分析 2026-05-14 v1

摘要

Let EE be an order continuous K\"{o}the function space over a non purely atomic probability measure μ\mu and let XX be a Banach space, with topological duals EE^* and XX^*, respectively. Let E(X)E(X) and E(X)E^*(X^*) be the corresponding K\"{o}the-Bochner function spaces and consider E(X)E^*(X^*) as a subspace of E(X)E(X)^*. We prove that if XX^* fails the Radon-Nikod\'{y}m property, then there is a bounded, non weakly null sequence (fn)(f_n) in E(X)E(X) such that φ,fn0\langle \varphi,f_n\rangle \to 0 for every φE(X)\varphi\in E^*(X^*); in particular, the closed unit ball of E(X)E^*(X^*) is not a James boundary for E(X)E(X). This extends a result by B. Cascales and A.J. Pallar\'{e}s [Collect. Math. 45 (1994), 263--270] on the case E=L1(μ)E=L_1(\mu) and allows us to answer a question posed recently by S. Dwivedi [Rev. Real Acad. Cienc. Exactas Fis. Nat. Ser. A-Mat. RACSAM 120 (2026), 71].

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引用

@article{arxiv.2605.13240,
  title  = {On weak convergence in K\"{o}the-Bochner function spaces},
  author = {José Rodríguez},
  journal= {arXiv preprint arXiv:2605.13240},
  year   = {2026}
}