Let $\mathcal C$ be a locally presentable category. Then by definition, $\mathcal C$ has all small colimits. Nontrivially, we also have
Theorem 1: (Gabriel and Ulmer?) $\mathcal C$ also has all small limits.
I'm wondering if there exists some kind of "relative" version of this theorem. I think this should take the form of some kind of simplified criterion for checking that a functor between locally presentable categories preserves all small limits. But I don't know what the statement of such a criterion should be.
Question: Let $F: \mathcal C \to \mathcal D$ be a functor between locally presentable categories. Does there exist a criterion for checking that $F$ preserves small limits? (perhaps under additional hypotheses on $F$ -- e.g. maybe as a baseline we should assume that $F$ is accessible)
Such a criterion should be specific to the locally presentable setting, so "$F$ has a left adjoint" or "$F$ preserves products and equalizers" don't really fit the bill.
It might be argued that there is a relative version of Theorem 1 not along the above lines, namely the special adjoint functor theorem for locally presentable categories (which says that $F$ is a right adjoint iff it is accessible and preserves small limits). But I think I might be justified in hoping for some other statement besides this one to be available.
