Let $P$ be a small category, and let $F:P\to M$ be a diagram in a left-proper combinatorial model category $M$.  We say that $F$ is a _diagram of cofibrations_ if for every object $p\in P$, $F(p)$ is cofibrant, and for any $f:p\to p'$ in $\mathrm{Arr}(P)$, $F(f)$ is a cofibration.  

Recall that a diagram $F: P\to M$ is called projectively cofibrant if the map $\emptyset \to F$ in $M^P$ has the left lifting property with respect to the class of morphisms that are objectwise trivial fibrations.  

An easy example of when this holds is a pushout diagram.  Such a diagram is projectively cofibrant if and only if it is a diagram of cofibrations.  Another example of such a diagram is the diagram for transfinite composition.  

Are there any known rules of thumb for when we can say that a diagram of cofibrations is projectively cofibrant?  

If no general result exists, I'm specifically interested in the case where $M$ is the category of simplicial sets and $P$ is a poset.