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Constructive higher sheaf models with applications to synthetic mathematics
Published 14 May 2026 in cs.LO and math.LO | (2605.15126v1)
Abstract: There have recently been several developments in synthetic mathematics using extensions of dependent type theory with univalence and higher inductive types: simplicial homotopy type theory, synthetic algebraic geometry and synthetic Stone duality. We provide a foundation of higher sheaf models of type theory in a constructive metatheory and, in particular, build constructive models of these formal systems.
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