The stresses on centrally symmetric complexes and the lower bound theorems

Abstract

In 1987, Stanley conjectured that if a centrally symmetric Cohen--Macaulay simplicial complex of dimension d-1 satisfies hi()=di for some i≥ 1, then hj()=dj for all j≥ i. Much more recently, Klee, Nevo, Novik, and Zheng conjectured that if a centrally symmetric simplicial polytope P of dimension d satisfies gi(∂ P)=di-di-1 for some d/2≥ i≥ 1, then gj(∂ P)=dj-dj-1 for all d/2≥ j≥ i. This note uses stress spaces to prove both of these conjectures.