Sheafification is needed in limits and colimits of condensed abelian groups? If I have a functor $T: i \mapsto T_i$ from an index category to condensed abelian groups the limit and colimit of this functor are just $S \mapsto \lim_i T_i (S)$ and $S \mapsto \text{colim}_i T_i (S)$ or sheafification...