Conformal arc-length as 12 dimensional length of the set of osculating circles

Abstract

The set of osculating circles of a given curve in 3 forms a curve in the set of oriented circles in 3. We show that its "12-dimensional measure" with respect to the pseudo-Riemannian structure of the set of circles is proportional to the conformal arc-length of the original curve, which is a conformally invariant local quantity discovered in the first half of the last century.