Let $(X,\mathcal{A},\mu)$ be a a measure space, and $f$ and $g$ two measurable functions. Now if $f$ and $g$ are nonnegative and $f\leq g$, it can be easily seen that $\int f\,d\mu\leq \int g\,d\mu$, where the possibility of either side being $\infty$ is allowed.
But if $f$ and $g$ are NOT nonnegative, is it still true? It is of course true if they are in $L^1$ but if we are not sure they are in $L^1$ is it true? What if we know nothing about $f$ (besides being measurable) but do know that $g$ is nonnegative or that $g\in L^1$, can we still say $\int f\,du\leq\int g\,d\mu$?
Any feedback will be welcome and appreciated, thanks in advance