Explore a mathematical colloquium talk that delves into the double category Cat^#, constructed from polynomial comonads, and its applications in categorical database theory, effects handlers in programming, and discrete open dynamical systems. Learn about the fundamental components of Cat^#, including categories as objects, cofunctors as arrows, and prafunctors as pro-arrows. Discover how monads among prafunctors, such as the free category monad on graphs, have algebras encompassing categories, n-categories, double categories, multicategories, monoids, and monoidal categories. Gain insights into the Cat^# approach for defining higher categories and examine various constructions from higher category theory, including higher categorical nerves and algebraic prafunctors like the free monoidal category monad on Cat.
Overview
Syllabus
Brandon Shapiro: "(Higher) category theory in Cat^#"
Taught by
Topos Institute
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