%0 Journal Article
%T Obstructions to weak decomposability for simplicial polytopes
%A Nicolai H£¿hnle
%A Steven Klee
%A Vincent Pilaud
%J Mathematics
%D 2012
%I arXiv
%X Provan and Billera introduced notions of (weak) decomposability of simplicial complexes as a means of attempting to prove polynomial upper bounds on the diameter of the facet-ridge graph of a simplicial polytope. Recently, De Loera and Klee provided the first examples of simplicial polytopes that are not weakly vertex-decomposable. These polytopes are polar to certain simple transportation polytopes. In this paper, we refine their analysis to prove that these $d$-dimensional polytopes are not even weakly $O(\sqrt{d})$-decomposable. As a consequence, (weak) decomposability cannot be used to prove a polynomial version of the Hirsch conjecture.
%U http://arxiv.org/abs/1206.6143v1