Flexible circuits in the d-dimensional rigidity matroid

Abstract

A bar-joint framework (G,p) in Rd is rigid if the only edge-length preserving continuous motions of the vertices arise from isometries of Rd. It is known that, when (G,p) is generic, its rigidity depends only on the underlying graph G, and is determined by the rank of the edge set of G in the generic d-dimensional rigidity matroid Rd. Complete combinatorial descriptions of the rank function of this matroid are known when d=1,2, and imply that all circuits in Rd are generically rigid in Rd when d=1,2. Determining the rank function of Rd is a long standing open problem when d≥ 3, and the existence of non-rigid circuits in Rd for d≥ 3 is a major contributing factor to why this problem is so difficult. We begin a study of non-rigid circuits by characterising the non-rigid circuits in Rd which have at most d+6 vertices.