Homotopy invariants in small categories

Abstract

Tanaka introduced a notion of Lusternik Schnirelmann category, denoted ccat\, C, of a small category C. Among other properties, he proved an analog of Varadarajan's theorem for fibrations, relating the LS-categories of the total space, the base and the fiber. In this paper we recall the notion of homotopic distance D(F,G) between two functors F,G C D, later introduced by us, which has ccat C=D(idC,) as a particular case. We consider another particular case, the distance D(p1,p2) between the two projections p1,p2 C× C C, which we call the categorical complexity of the small category C. Moreover, we define the higher categorical complexity of a small category and we show that it can be characterized as a higher distance. We prove the main properties of those invariants. As a final result we prove a Varadarajan's theorem for the homotopic distance for Grothendieck bi-fibrations between small categories.