Kripke-Joyal forcing for type theory and uniform fibrations

S. Awodey; Nicola Gambino; S. Hazratpour

doi:10.1007/s00029-024-00962-2

Kripke-Joyal forcing for type theory and uniform fibrations

S. Awodey, Nicola Gambino, S. Hazratpour

Pure Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

We introduce a new method for precisely relating certain kinds of algebraic structures in a presheaf category and judgements of its internal type theory. The method provides a systematic way to organise complex diagrammatic reasoning and generalises the well-known Kripke-Joyal forcing for logic. As an application, we prove several properties of algebraic weak factorisation systems considered in Homotopy Type Theory.

Original language	English
Journal	Selecta Mathematica
Volume	30
DOIs	https://doi.org/10.1007/s00029-024-00962-2
Publication status	Published - 31 Jul 2024

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10.1007/s00029-024-00962-2Licence: CC BY

2110.14576v1Submitted manuscript, 627 KB

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abstract = " We introduce a new method for precisely relating certain kinds of algebraic structures in a presheaf category and judgements of its internal type theory. The method provides a systematic way to organise complex diagrammatic reasoning and generalises the well-known Kripke-Joyal forcing for logic. As an application, we prove several properties of algebraic weak factorisation systems considered in Homotopy Type Theory. ",

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AU - Hazratpour, S.

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AB - We introduce a new method for precisely relating certain kinds of algebraic structures in a presheaf category and judgements of its internal type theory. The method provides a systematic way to organise complex diagrammatic reasoning and generalises the well-known Kripke-Joyal forcing for logic. As an application, we prove several properties of algebraic weak factorisation systems considered in Homotopy Type Theory.

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VL - 30

JO - Selecta Mathematica

JF - Selecta Mathematica

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Kripke-Joyal forcing for type theory and uniform fibrations

Abstract

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