Convergence of best best $L_{\infty }$-approximations

Abstract:

Let $(\Omega , \mathcal {A}, \mu )$ be a probability space and let $\{ {\mathcal {B}_i}\} _{i = 1}^\infty$ be an increasing sequence of subsigma algebras of $\mathcal {A}$. Let $A = {L_\infty }(\Omega , \mathcal {A}, \mu )$, let ${B_i} = {L_\infty }(\Omega ,{\mathcal {B}_i},\mu )$, and let $f \in A$. Let ${f_i}$ denote the best best ${L_\infty }$-approximation to $f$ by elements of ${B_i}$. It is shown that ${\lim _i}{f_i}(x)$ exists a.e.