AbstractWe study the coherence, that is the equality of canonical natural transformations in non-free symmetric monoidal closed categories (smccs). To this aim, we use proof theory for intuitionistic multiplicative linear logic (imll) with unit. The study of coherence in non-free smccs is reduced to the study of equivalences on terms (representing morphisms) in the free category, which include the equivalences induced by the smcc structure. The free category is reformulated as the sequent calculus for imll with unit so that only equivalences on derivations in this system are to be considered. We establish that any equivalence induced by the equality of canonical natural transformations over a model can be axiomatized by some set of “critica...