Simplicial function spaces (Q1824148)

A characterization of simplicial spaces has been given by Choquet-Meyer theorem [Theorem 7.3 in the book ``Convexity theory and its application in functional analysis'' by \textit{L. Asimow} and \textit{A. J. Ellis} (1980; Zbl 0453.46013)]. And in this paper the author gets a new characterization of weakly simplicial spaces: Theorem 1. A function space B on X is weakly simplicial on X if and only if there is a selection \(x\mapsto \lambda x\in M_ x(B)\) of B- representing measures on X such that \[ \hat f^ B(x)=\int f d\lambda_ x,\quad for\quad all\quad f\in P_ B(x)\quad and\quad all\quad x\in X. \] In addition, the author gets an improvement of Theorem 2 of the paper ``Enlarging a subspace of C(X) without changing the Choquet boundary'' by \textit{E. Briem} [in [Math. Scand 44, 218-224 (1979; Zbl 0413.46008)].