Pointwise Addition on Space of Real-Valued Measurable Functions Identified by A.E. Equality is Well-Defined

Theorem
Let $\struct {X, \Sigma, \mu}$ be a measure space, and let $p \in \closedint 1 \infty$.

Let $\map {\mathcal M} {X, \Sigma, \R}$ be the set of real-valued $\Sigma$-measurable functions on $X$.

Let $\sim$ be the almost-everywhere equality equivalence relation on $\map {\mathcal M} {X, \Sigma}$.

Let $\map {\mathcal M} {X, \Sigma, \R}/\sim$ be the set of real-valued $\Sigma$-measurable functions quotiented by $\sim$.

Then pointwise addition on $\map {\mathcal M} {X, \Sigma, \R}/\sim$ is well-defined.

Proof
Let $E_1, E_2 \in \map {\mathcal M} {X, \Sigma, \R}/\sim$.

We need to show that $E_1 + E_2$ is independent of the choice of representative for $E_1$ and $E_2$.

Suppose that:


 * $\eqclass f \sim = \eqclass F \sim = E_1$

and:


 * $\eqclass g \sim = \eqclass G \sim = E_2$

From Equivalence Class Equivalent Statements, we have:


 * $f \sim F$

and:


 * $g \sim G$

From Pointwise Addition preserves A.E. Equality, we have:


 * $f + g \sim F + G$

That is, from Equivalence Class Equivalent Statements:


 * $\eqclass {f + g} \sim = \eqclass {F + G} \sim$

which is what we aimed to show.