Let $F$ be a totally real field and $p$ a rational prime unramified in $F$. For each subset $P$ of primes of $F$ above $p$, there is the notion of partially classical Hilbert modular forms, where $P=\varnothing$ recovers the overconvergent forms and $P$ being the full set of primes above $p$ recovers classical forms. Given $P$, we $p$-adically interpolate the classical modular sheaves to construct families of partially classical Hilbert modular forms with weights varying in appropriate weight spaces. We then construct the corresponding eigenvariety, which recovers the eigenvariety constructed by Andreatta--Iovita--Pilloni when $P=\varnothing$. By contrast, it is unclear whether each partially classical form can be put into a partially classical family.
