The Radon-NikodYm property of L-Banach spaces and the dual representation theorem of L-Bochner function spaces

Abstract

In this paper, we first introduce L-μ-measurable functions and L-Bochner integrable functions on a finite measure space (S,F,μ), and give an L-valued analogue of the canonical Lp(,F,μ). Then we investigate the completeness of such an L-valued analogue and propose the Radon-Nikodym property of L-Banach spaces. Meanwhile, an example constructed in this paper shows that there do exist an L-Banach space which fails to possess the Radon-Nikodym property. Finally, based on above work, we establish the dual representation theorem of L-Bochner integrable function spaces, which extends and improves the corresponding classical result.