Z-Categories I

Abstract

This paper is the first in a series of two papers, Z-Categories I and Z-Categories II, which develop the notion of Z-category, the natural bi-infinite analog to strict ω-categories, and show that the (∞,1)-category of spectra relates to the (∞,1)-category of homotopy coherent Z-categories as the pointed groupoids. In this work we provide a 2-categorical treatment of the combinatorial spectra of Kan and argue that this description is a simplicial avatar of the abiding notion of homotopy coherent Z-category. We then develop the theory of limits in the 2-category of categories with arities of Berger, Mellies, and Weber to provide a cellular category which is to Z-categories as is to 1-categories or n is to n-categories. In an appendix we provide a generalization of the spectrification functors of 20th century stable homotopy theory in the language of category-weighted limits.