Higher Hida theory for Hilbert modular varieties in the totally split case

We study $p$-adic properties of the coherent cohomology of some automorphic sheaves on the Hilbert modular variety $X$ for a totally real field $F$ in the case where the prime $p$ is totally split in $F$. More precisely, we develop higher Hida theory a la Pilloni, constructing, for $0\leq q\leq [F:\mathbb{Q}]$, some modules $M^q$ which $p$-adically interpolate the ordinary part of the cohomology groups $H^q(X, \underline{\omega}^{\kappa})$, varying the weight $\kappa$ of the automorphic sheaf.