We study coherence structures in homotopy type theory interpreted in an (∞,1)-topos in the sense of Lurie. We introduce a monadic endofunctor on the ambient ∞-topos which models iterated identity formation and coherence refinement as internal categorical dynamics. Using homotopy cardinality, we define a notion of asymptotic growth under iteration of this monadic structure. All constructions are internal to the semantic interpretation of homotopy type theory in an ∞-topos with univalence. No additional axioms beyond standard homotopy type theory are introduced. The paper also discusses categorical structural constraints and conjectural asymptotic regimes of the induced dynamical system.
Yugo Hidaka (Sat,) studied this question.
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