English

On Flattenability of Graphs

Computational Geometry 2015-06-30 v2

Abstract

We consider a generalization of the concept of dd-flattenability of graphs - introduced for the l2l_2 norm by Belk and Connelly - to general lpl_p norms, with integer PP, 1p<1 \le p < \infty, though many of our results work for ll_\infty as well. The following results are shown for graphs GG, using notions of genericity, rigidity, and generic dd-dimensional rigidity matroid introduced by Kitson for frameworks in general lpl_p norms, as well as the cones of vectors of pairwise lppl_p^p distances of a finite point configuration in dd-dimensional, lpl_p space: (i) dd-flattenability of a graph GG is equivalent to the convexity of dd-dimensional, inherent Cayley configurations spaces for GG, a concept introduced by the first author; (ii) dd-flattenability and convexity of Cayley configuration spaces over specified non-edges of a dd-dimensional framework are not generic properties of frameworks (in arbitrary dimension); (iii) dd-flattenability of GG is equivalent to all of GG's generic frameworks being dd-flattenable; (iv) existence of one generic dd-flattenable framework for GG is equivalent to the independence of the edges of GG, a generic property of frameworks; (v) the rank of GG equals the dimension of the projection of the dd-dimensional stratum of the lppl_p^p distance cone. We give stronger results for specific norms for d=2d = 2: we show that (vi) 2-flattenable graphs for the l1l_1-norm (and ll_\infty-norm) are a larger class than 2-flattenable graphs for Euclidean l2l_2-norm case and finally (vii) prove further results towards characterizing 2-flattenability in the l1l_1-norm. A number of conjectures and open problems are posed.

Keywords

Cite

@article{arxiv.1503.01489,
  title  = {On Flattenability of Graphs},
  author = {Meera Sitharam and Joel Willoughby},
  journal= {arXiv preprint arXiv:1503.01489},
  year   = {2015}
}
R2 v1 2026-06-22T08:44:44.227Z