Abstract 3-Rigidity and Bivariate C21-Splines II: Combinatorial Characterization

Abstract

We showed in the first paper of this series that the generic C21-cofactor matroid is the unique maximal abstract 3-rigidity matroid. In this paper we obtain a combinatorial characterization of independence in this matroid. This solves the cofactor counterpart of the combinatorial characterization problem for the rigidity of generic 3-dimensional bar-joint frameworks. We use our characterization to verify that the counterparts of conjectures of Dress (on the rank function) and Lov\'asz and Yemini (which suggested a sufficient connectivity condition for rigidity) hold for this matroid.