Question
Proposition 2.11 (Exercise 10) – The following implications are valid if and only if the measure is complete:
a.) If $f$ is measurable and $f = g$ $\mu$-a.e., then $g$ is measurable.
b.) If $f_n$ is measurable for $n\in \mathbb{N}$ and $f_n\rightarrow f$ $\mu$-a.e., then $f$ is measurable.
Attempted Proof a.) We want to show that for every Borel set $B\subset \mathbb{R}$, $g^{-1}(B)$ is measurable. Suppose $\mu$ is complete, since $f = g$ $\mu$-a.e., there exists a measurable set $E$ such that $\mu(E) = 0$, in fact, for all $x\notin E$ $f(x) = g(x)$. Then $$g^{-1}(B) = (g^{-1}(B)\cap E)\cup(f^{-1}(B)\setminus E)$$
since $f$ is measurable we have that $f^{-1}(B)$ is measurable, and since $\mu$ is complete, we have $g^{-1}(B)\cap E$ is measurable. Thus $g^{-1}(B)$ is measurable.
Now suppose part a.) holds. Let $N\subset E$, where $E$ has measure zero. Let $f = 1_{E}$ and $g = 1_{N}$ then $f = g$ a.e., so $g$ is measurable. Thus, $g^{-1}(\{1\}) = N$ is measurable. Therefore $\mu$ is complete.
Attempted proof b.) We are given $f_n$ to be measurable for $n\in\mathbb{N}$, and $f_n\rightarrow f$ a.e., from proposition 2.7 we can let $$\hat{f} = \lim_{n\rightarrow \infty}\sup f_n$$ Since $f_n$ is measurable then so is $\hat{f}$. Thus given the fact that $f_n\rightarrow f$ e.e. then we have $\hat{f} = f$ a.e., so by part a.) $f$ is measurable.
I am not sure how to proceed with the converse of part b.). Any suggestions is greatly appreciated.
Background Information
Proposition 2.7 – If $\{f_j\}$ is a sequence of $\overline{\mathbb{R}}$-valued measurable functions on $(X,M)$, then the functions \begin{align*}
g_1(x) &= \sup_{j}f_j(x) \ \ \ \ \ &g_3(x) = \lim_{j\rightarrow \infty}\sup f_j(x)\\
g_2(x) &= \inf_{j}f_j(x) \ \ \ \ \ &g_4(x) = \lim_{j\rightarrow \infty}\inf f_j(x)
\end{align*}
are all measurable. If $f(x) = \lim_{j\rightarrow \infty}f_j(x)$ exists for every $x\in X$, then $f$ is measurable.
Best Answer
Your proof is essentially correct. The proof of the last part, that is (b. $\Rightarrow$ $\mu$ is complete), is very similar to the proof that (a. $\Rightarrow$ $\mu$ is complete).
Here is the proof in details.
Proof:
($\mu$ is complete $\Rightarrow$ a.)
Suppose $\mu$ is complete. Suppose $f$ is measurable and $f = g$ $\mu$-a.e.. Since $f = g$ $\mu$-a.e., there exists a measurable set $E$ such that $\mu(E) = 0$ and, for all $x\notin E$, $f(x) = g(x)$.
Given any Borel set $B\subset \mathbb{R}$, we have $$g^{-1}(B)= (g^{-1}(B)\cap E) \cup (g^{-1}(B) \cap E^c)=(g^{-1}(B)\cap E)\cup(f^{-1}(B)\setminus E)$$
since $f$ is measurable we have that $f^{-1}(B)$ is measurable, since $E$ is measurable, $f^{-1}(B)\setminus E$ is measurable. Since $\mu$ is complete and $\mu(E)=0$, we have $g^{-1}(B)\cap E \subset E$ is measurable. Thus $g^{-1}(B)$ is measurable.
(a. $\Rightarrow$ $\mu$ is complete)
Suppose a. holds. Let $E$ be a measurable set such that $\mu(E)=0$ and let $A$ be any subset of $E$.
Take $f=0$ (the null function) and $g=\chi_A$ (the indicator function of $A$). We have that $f$ is measurable and $f=g$ $\mu$-a.e., so by a.), we have that $g$ is measurable. Since $g^{-1}(\{1\})=A$, we have that $A$ is measurable. So $\mu$ is complete.
($\mu$ is complete $\Rightarrow$ b.)
Suppose $\mu$ is complete. Suppose $f_n$ is measurable for $n\in\mathbb{N}$, and $f_n\rightarrow f$ a.e..
Let $$\hat{f} = \lim_{n\rightarrow \infty}\sup f_n$$ Since $f_n$ is measurable, by proposition 2.7 we have that $\hat{f}$ is measurable. Thus given the fact that $f_n\rightarrow f$ e.e., we have $\hat{f} = f$ a.e., so, since $\mu$ is complete, a.) holds and we can conclude that $f$ is measurable.
(b. $\Rightarrow$ $\mu$ is complete)
Suppose b. holds. Let $E$ be a measurable set such that $\mu(E)=0$ and let $A$ be any subset of $E$.
Take $f_n=0$, for all $n\in \mathbb{N}$ and $f=\chi_A$ (the indicator function of $A$). We have that$f_n$ is measurable for $n\in \mathbb{N}$ and $f_n\rightarrow f$ $\mu$-a.e., so by b.), we have that $f$ is measurable. Since $f^{-1}(\{1\})=A$, we have that $A$ is measurable. So $\mu$ is complete.