Graphs with single interval Cayley configuration spaces in 3-dimensions

Abstract

We prove a conjectured graph theoretic characterization of a geometric property of 3 dimensional linkages posed 15 years ago by Sitharam and Gao, motivated by their equivalent characterization for d 2 that does not generalize to d 3. A linkage (G,) contains a finite simple undirected graph G and a map that assigns squared Euclidean lengths to the edges of G. A d-realization of (G,) is an assignment of points in Rd to the vertices of G for which pairwise squared distances between points agree with . For any positive integer d ≤ 3, we characterize pairs (G,f), where f is a nonedge of G, such that, for any linkage (G,), the lengths attained by f form a single interval - over the (typically a disconnected set of) d-realizations of (G,). Although related to the minor closed class of d-flattenable graphs, the class of pairs (G,f) with the above property is not closed under edge deletions, has no obvious well quasi-ordering, and there are infinitely many minimal graph-nonedge pairs - with respect to edge contractions - in the complement class. Our characterization overcomes these obstacles, is based on the forbidden minors for d-flattenability for d ≤ 3, and contributes to the theory of Cayley configurations with many applications. Helper results and corollaries provide new tools for reasoning about configuration spaces and completions of partial 3-tree linkages, (non)convexity of Euclidean measurement sets in 3-dimensions, their projections, fibers and sections. Generalizations to higher dimensions and efficient algorithmic characterizations are conjectured.