A survey of Univalent Foundations (by Eric Finster, November 13th, 2014)
We give an overview of the foundational point of view advocated by Voevodsky’s Univalent Foundations program and explain how these ideas are realized by Martin-Lof type theory with identity types. In particular, we focus on the role of the univalence axiom as an invariance principle, embedded in type theory, which is absent from traditional set-theoretic foundations, and explain how this point of view leads to a unification of certain logical and geometric principles.
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How I became seduced by univalent foundations
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Intensionality, Invariance, and Univalence, Steve Awodey
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An Intuitive Introduction to Motivic Homotopy Theory - Vladimir Voevodsky
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A Categorical View of Computational Effects
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Is Donald Trump A 'Fascist'? | Slavoj Zizek And Piers Morgan Debate
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David Spivak - Category Theory - Part 1 of 6 - λC 2017
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Reinventing Entropy | Compression is Intelligence Part 1
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Five Stages of Accepting Constructive Mathematics - Andrej Bauer
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Univalent Foundations: New Foundations of Mathematics | Vladimir Voevodsky
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The mathematical work of Vladimir Voevodsky - Dan Grayson
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How I became interested in foundations of mathematics
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∞-Category Theory for Undergraduates
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Per Martin Löf: How did 'judgement' come to be a term of logic ?
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Steve Awodey: Mac Lane and Carnap's Logical Syntax of Language
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Univalent Foundations Seminar - Steve Awodey
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André JOYAL - 1/4 A crash course in topos theory : the big picture
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Why Peter Scholze is once in a Generation Mathematician
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Richard P. Feynman: Probability and Uncertainty; The Quantum Mechanical View of Nature
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Naïve Type Theory by Thorsten Altenkirch (University of Nottingham, UK)
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