$\require{AMScd}$
For a rational fibrations $F \rightarrow E \xrightarrow{\pi} B$, we have a nice description in terms of sullivan minimal models, namely a commutative diagram of cdga's
$$  
\begin{CD}
        A_{PL}(B) @>>> A_{PL}(E) @>{\pi}>> A_{PL}(F) \\
        @AAA @AAA @AAA \\
        (\wedge V ,d_{B}) @>>> (\wedge V \otimes \wedge Z,d) @>>> (\wedge Z,d_{F})
\end{CD}
$$
where all vertical arrows are minimal models. This is sometimes called a $\wedge$-minimal $\wedge$-model. See for instance https://www.jstor.org/stable/pdf/1997895.pdf?refreqid=excelsior%3Aacbce1fbb0022d42e2fe7d1265efcb8c

Is this construction natural in some sense? Say for 'morphisms of fibre bundles' or 'morphisms of fibre bundles preserving a common $G$-structure'.