Recursive Difference Categories and Topos-Theoretic Universality

We introduce a radically minimal categorical foundation for logic, semantics, and computation, built from a single generative axiom of recursive difference. From the null mnema M0 and iterated labeled extensions by D, we form the free category M and its sheaf topos Sh(M). We prove: Modal completeness: Lawvere-Tierney topologies on Sh(M) classify all standard modal logics (K, T, S4, S5) purely via submonoids of the free monoid D*. Fixed-point expressivity: The internal mu-calculus over infinite branching realizes the full Janin-Walukiewicz theorem. ZFC and Set-modeling: Sh(M) embeds Set via constant sheaves and internalizes a model of ZFC by recursive descent. Turing encodability: Finite-automaton and Turing-machine sheaves arise syntactically, yielding a fully mechanizable internal semantics. Internal meta-theorems: Godel completeness and Lowenheim-Skolem hold internally via total descent and vanishing first cohomology H1. We further construct faithful geometric embeddings: Set -> Sh(M) -> Eff, and Sh(M) -> sSet, connecting to realizability and simplicial frameworks. Unlike HoTT and classical site-theoretic models, Sh(M) exhibits total cohomological triviality, no torsors, and fully conservative gluing of all local data. Thus, we realize Lawvere's vision of deriving semantics-modal, set-theoretic, computational, and meta-logical-entirely from one syntactic axiom, unifying logic, semantics, and computation under a single recursive principle.