k-fold circuits and coning in rigidity matroids

Abstract

In 1980 Lov\'asz introduced the concept of a double circuit in a matroid. The 2nd, 3rd and 4th authors recently generalised this notion to k-fold circuits (for any natural number k) and proved foundational results about these k-fold circuits. In this article we use k-fold circuits to derive new results on the generic d-dimensional rigidity matroid Rd. These results include analysing 2-sums, showing sufficient conditions for the k-fold circuit property to hold for k-fold Rd-circuits, and giving an extension of Whiteley's coning lemma. The last of these allows us to reduce the problem of determining if a graph G with a vertex v of sufficiently high degree is independent in Rd to that of verifying matroidal properties of G-v in Rd-1.