The following pages link to Eugenia Cheng (Q276489):
Displaying 32 items.
- Pseudo-distributive laws (Q276490) (← links)
- Comparing operadic theories of \(n\)-category (Q650989) (← links)
- Monad interleaving: a construction of the operad for Leinster's weak \(\omega \)-categories (Q847679) (← links)
- Weak \(n\)-categories: Opetopic and multitopic foundations. (Q1421253) (← links)
- Weak \(n\)-categories: Comparing opetopic foundations. (Q1426337) (← links)
- An \(\omega\)-category with all duals is an \(\omega\)-groupoid (Q2463395) (← links)
- Cakes, custard and category theory. Easy recipes for understanding complex maths (Q2800427) (← links)
- A direct proof that the category of 3-computads is not Cartesian closed (Q2837317) (← links)
- Iterated distributive laws (Q3002206) (← links)
- A note on the Penon definition of $n$-category (Q3015734) (← links)
- The periodic table of $n$-categories for low dimensions II: degenerate tricategories (Q3105520) (← links)
- Cyclic multicategories, multivariable adjunctions and mates (Q3191179) (← links)
- (Q3192734) (← links)
- (Q3594561) (← links)
- The category of opetopes and the category of opetopic sets (Q4444125) (← links)
- (Q4645161) (← links)
- (Q4994734) (← links)
- (Q5022892) (← links)
- Distributive laws for Lawvere theories (Q5087649) (← links)
- The Joy of Abstraction (Q5097617) (← links)
- (Q5193041) (← links)
- Weak $\infty$-categories via terminal coalgebras (Q5239850) (← links)
- Iterated icons (Q5248249) (← links)
- (Q5269774) (← links)
- The periodic table of n-categories for low dimensions I: degenerate categories and degenerate bicategories (Q5431512) (← links)
- A relationship between trees and Kelly–Mac Lane graphs (Q5481576) (← links)
- Distributive Laws for Lawvere Theories (Invited Talk) (Q6061659) (← links)
- How machines can make mathematics more congressive (Q6130528) (← links)
- Weak vertical composition (Q6421415) (← links)
- Weak vertical composition (Q6593825) (← links)
- Weak vertical composition. II: Totalities (Q6595526) (← links)
- Is math real? How simple questions lead us to mathematics' deepest truths (Q6597791) (← links)
