\noindent{}Feydy et al.\ introduced the notion of \gls{half-reif} as an improvement over the use of \gls{reification} \autocite*{feydy-2011-half-reif}.
They show that some of the problems and expenses of the use of \gls{reification} can be mitigated using this technique.
In addition, the creation of propagators for \glspl{half-reif} of constraints can often be an easy process.
It is not always possible, however, to use a \gls{half-reif} instead of a \gls{reification}.
The authors identify the conditions required for the usage of \gls{half-reif} and provide an algorithm that flattens a subset of the \minizinc{} language using the technique.
Crucially, this algorithm does \emph{not} directly generalize to the full \minizinc{} language.
The chosen subset omits let-expressions, which can complicate the process.
An identifier for the same expression can suddenly occur in multiple locations.

This chapter re-evaluates the usage of \gls{half-reif} and provides the first full implementation of a flattener for \minizinc{} with support for \gls{half-reif}.
In \cref{sec:half-intro,sec:half-propagation} we introduce the core concepts of \gls{half-reif} and propagators for half-reified \constraints{}, as discussed by Feydy et al.
An additional benefit of \gls{half-reif} is that its decomposition can be significantly smaller than the decomposition of a \gls{reification}.
\Cref{sec:half-decomposition} shows the benefits of \gls{half-reif} when writing decompositions for \gls{mip} and \gls{sat} \solvers{}.
In \cref{sec:half-context} we introduce our new context analysis algorithm: a way to determine where \gls{half-reif} can be used in \microzinc{}, and by extend \minizinc{}.
Then, in \cref{sec:half-flattening}, we elaborate on how the usage of \gls{half-reif} changes the flattening process.
Finally, the effects of propagators for half-reified constraints and the automatic introduction of half-reified is analysed in \cref{sec:half-experiments}.