ACT 2020 Tutorial: The Yoneda lemma in the category of matrices (Emily Riehl)

Recording of the second tutorial of the Applied Category Theory 2020 remote conference. Main website: https://act2020.mit.edu/ More tutorials in this playlist:    • ACT 2020 Tutorials   Title: The Yoneda lemma in the category of matrices Speaker: Emily Riehl Abstract: The fundamental theorem of category theory is indisputably the Yoneda lemma, though on first acquaintance its statement is forbiddingly obscure. This talk will introduce the Yoneda lemma by describing its implications in the category whose objects are natural numbers and in which a morphism from n to m is an m x n matrix.

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ACT 2020 Tutorial: Introduction to Applied Category Theory (David Spivak)
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ACT 2020 Tutorial: Introduction to Applied Category Theory (David Spivak)

Emily Riehl: Synthetic perspectives on the Yoneda lemma
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Emily Riehl: Synthetic perspectives on the Yoneda lemma

Prof. Emily Riehl | Formalizing invisible mathematics: case studies from higher category theory
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Prof. Emily Riehl | Formalizing invisible mathematics: case studies from higher category theory

Emily Riehl: Formalizing post-rigorous mathematics
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Emily Riehl: Formalizing post-rigorous mathematics

Emily Riehl Makes Infinity Categories Elementary
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Emily Riehl Makes Infinity Categories Elementary

How the Yoneda lemma applies
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How the Yoneda lemma applies

The synthetic theory of ∞-categories vs the synthetic theory of ∞-categories - Emily Riehl
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The synthetic theory of ∞-categories vs the synthetic theory of ∞-categories - Emily Riehl

Mindscape 146 | Emily Riehl on Topology, Categories, and the Future of Mathematics
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Mindscape 146 | Emily Riehl on Topology, Categories, and the Future of Mathematics

Lambda World 2019 - A categorical view of computational effects - Emily Riehl
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Lambda World 2019 - A categorical view of computational effects - Emily Riehl

Representables and Yoneda 1
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Representables and Yoneda 1

A Categorical View of Computational Effects
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A Categorical View of Computational Effects

ACT 2020 Tutorial: Monads and comonads (Paolo Perrone)
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ACT 2020 Tutorial: Monads and comonads (Paolo Perrone)

Applied Category Theory
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Applied Category Theory

David Spivak - Category Theory - Part 1 of 6 - λC 2017
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David Spivak - Category Theory - Part 1 of 6 - λC 2017

Nonetheless one should learn the language of topos: Grothendieck... - Colin McLarty [2018]
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Nonetheless one should learn the language of topos: Grothendieck... - Colin McLarty [2018]

How I became seduced by univalent foundations
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How I became seduced by univalent foundations

What is Category Theory in mathematics? Johns Hopkins' Dr. Emily Riehl explains
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What is Category Theory in mathematics? Johns Hopkins' Dr. Emily Riehl explains

Emily Riehl | Feb 16, 2021 | Elements of ∞-Category Theory
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Emily Riehl | Feb 16, 2021 | Elements of ∞-Category Theory

The Yoneda Embedding Expresses Whether, What, How, Why
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The Yoneda Embedding Expresses Whether, What, How, Why

A Sensible Introduction to Category Theory
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A Sensible Introduction to Category Theory