On the lattice structure of the space of all Bochner integrable Banach lattice-valued functions
Abstract
Suppose (X,,μ) is a finite measure space, E is a Banach lattice, and B(X,E,μ) is the space of all Bochner integrable E-valued functions. In this note, we show that B(X,E,μ) is a KB-space or has the sequential Fatou property if and only if so is E. Among this, some results about Bochner integral convergence in B(X,E,μ), using order structure of E, have been proved, as well.
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