Unified Functorial Signal Representation II: Category action, Base Hierarchy, Geometries as Base structured categories

Abstract

In this paper we propose and study few applications of the base structured categories X F C, ∫C F, X F C and ∫C F. First we show classic transformation groupoid X /\!\!/ G simply being a base-structured category ∫G F. Then using permutation action on a finite set, we introduce the notion of a hierarchy of base structured categories [(X2a F2a B2a) (X2b F2b B2b) ...] F1 B1 that models local and global structures as a special case of composite Grothendieck fibration. Further utilizing the existing notion of transformation double category (X1 F1 B1) /\!\!/ 2G, we demonstrate that a hierarchy of bases naturally leads one from 2-groups to n-category theory. Finally we prove that every classic Klein geometry is the Grothendieck completion (G = X F H) of F: H F Man∞ U Set. This is generalized to propose a set-theoretic definition of a groupoid geometry (G,B) (originally conceived by Ehresmann through transport and later by Leyton using transfer) with a principal groupoid G = X B and geometry space X = G/B; which is essentially same as G = X F B or precisely the completion of F: B F Man∞ U Set.