We classify, in a nontrivial amenable collection of functors, all 2-chains up tothe relation of having the same 1-shell boundary. In particular, we prove thatin a rosy theory, every 1-shell of a Lascar strong type is the boundary of some2-chain, hence making the 1st homology group trivial. We also show that, unlikein simple theories, in rosy theories there is no upper bound on the minimallengths of 2-chains whose boundary is a 1-shell.

We study the class of weakly locally modular geometric theories introduced in [4], a common generalization of the classes of linear SU-rank 1 and linear o-minimal theories. We find new conditions equivalent to weak local modularity: “weak one-basedness”, absence of type definable “almost quasidesigns”, and “generic linearity”. Among other things, we show that weak one-basedness is closed under reducts. We also show that the lovely pair expansion of a non-trivial weakly one-based ω-categorical geometric theory interprets an infinite vector space over a finite field.

We provide a general theorem implying that for a (strongly) dependent theory T the theory of sufficiently well-behaved pairs of models of T is again (strongly) dependent. We apply the theorem to the case of lovely pairs of thorn-rank one theories as well as to a setting of dense pairs of first-order topological theories.