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