Higher Structures, Vol. 6, No. 1, pp. 80-181, 2022


Type theoretical approaches to opetopes

Pierre-Louis Curien, Cédric Ho Thanh, Samuel Mimram

Received April 26th 2019. Published online July 15th 2022.

Abstract:  Opetopes are algebraic descriptions of shapes corresponding to compositions in higher dimensions. As such, they offer an approach to higher-dimensional algebraic structures, and in particular, to the definition of weak $\omega$-categories, which was the original motivation for their introduction by Baez and Dolan. They are classically defined inductively (as free operads in Leinster’s approach, or as zoom complexes in the formalism of Kock et al.), using abstract constructions making them difficult to manipulate with a computer. In this paper, we present two purely syntactic descriptions of opetopes as sequent calculi, the first using variables to implement the compositional nature of opetopes, the second using a calculus of higher addresses. We prove that well-typed sequents in both systems are in bijection with opetopes as defined in the more traditional approaches. Additionally, we propose three variants to describe opetopic sets. We expect that the resulting structures can serve as natural foundations for mechanized tools based on opetopes.
Keywords:  Opetope; Opetopic set; Type theory; Polynomial functor
Classification MSC:  Primary 18D50, Secondary 03B15

PDF available at:  Institute of Mathematics CAS

Affiliations:   Pierre-Louis Curien, Research Institute for Foundations of Computer Science (IRIF), Paris University and CNRS, France, e-mail: curien@irif.fr; Cédric Ho Thanh, Research Institute for Foundations of Computer Science (IRIF), Paris University and CNRS, France, e-mail: cedric.hothanh@irif.fr; Samuel Mimram, Computer Science Laboratory of École Polytechnique (LIX), Palaiseau, France, e-mail: samuel.mimram@lix.polytechnique.fr

 
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