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  1. Type space functors and interpretations in positive logic.Mark Kamsma - 2023 - Archive for Mathematical Logic 62 (1):1-28.
    We construct a 2-equivalence \(\mathfrak {CohTheory}^{op }\simeq \mathfrak {TypeSpaceFunc}\). Here \(\mathfrak {CohTheory}\) is the 2-category of positive theories and \(\mathfrak {TypeSpaceFunc}\) is the 2-category of type space functors. We give a precise definition of interpretations for positive logic, which will be the 1-cells in \(\mathfrak {CohTheory}\). The 2-cells are definable homomorphisms. The 2-equivalence restricts to a duality of categories, making precise the philosophy that a theory is ‘the same’ as the collection of its type spaces (i.e. its type space functor). (...)
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  • On duality and model theory for polyadic spaces.Sam van Gool & Jérémie Marquès - 2024 - Annals of Pure and Applied Logic 175 (2):103388.
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  • Bilinear spaces over a fixed field are simple unstable.Mark Kamsma - 2023 - Annals of Pure and Applied Logic 174 (6):103268.
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