%0 Journal Article
%A Bombal Gordón, Fernando
%T On (V*) sets in Bochner integrable function spaces
%D 1991
%@ 0041-8986
%U https://hdl.handle.net/20.500.14352/57896
%X A subset A  of a Banach space E  is called a (V*) -set if, for every weakly unconditionally Cauchy (w.u.c.) series ∑x ∗ n   in E ∗  , lim n→∞ sup a∈A |x ∗ n (a)|=0 . Following Pełczyński, a Banach space E  is said to have property (V*) if every (V*)-set in E  is relatively weakly compact. The paper under review is mainly a survey of all known results connected with property (V*)  and with another property that the author introduced and called weak (V*) , where a Banach space E  is said to have weak (V*)  if (V*)-sets in E  are weakly conditionally compact
%~