Specific PDEs for Preserved Quantities in Geometry. II. Affine Transformations and Subgroups

Abstract

We extend finding geometrically-significant preserved quantities by solving specific PDEs to the affine transformations and subgroups. This can be viewed not only as a purely geometrical problem but also as a subcase of finding physical observables, and furthermore as part of the comparative study of Background Independence level-by-level in mathematical structure. While cross and scalar-triple products (combined with differences and ratios) suffice to formulate these preserved quantities in 2- and 3-d respectively, the arbitrary-dimensional generalization evokes the theory of forms. The affine preserved quantities are ratios of d-volume forms of differences, d-volume forms being the `top forms' supported by dimension d, and referring moreover to d-volumes of relationally-defined subsystems.