Completeness of the space of absolutely and upper integrable functions with values in a semi-normed space

This paper explores the absolute integrability of functions taking values in semi-normed spaces and locally convex topological vector spaces (LCTVS). We introduce an approach using upper integrals, inspired by previous work on integrals in these spaces. This method enables us to extend classical results from real-valued functions to LCTVS-valued functions. The paper demonstrates that the space of absolutely integrable functions forms a closed subspace within the framework of upper integrable functions. Additionally, we establish the completeness of these spaces, particularly for Fr\'echet spaces, using key tools such Fatou's lemma and Chebyshev's inequality.