Let $M_X = (X, \mathcal{F}_X)$ and $M_Y = (Y, \mathcal{F}_Y)$ each be a D1108: Measurable space.
A D18: Map $f : X \to Y$ is a measurable map from $M_X$ to $M_Y$ if and only if
\begin{equation}
\forall \, E \in \mathcal{F}_Y : f^{-1}(E) \in \mathcal{F}_X
\end{equation}