Centrally symmetric manifolds with few vertices

Abstract

A centrally symmetric 2d-vertex combinatorial triangulation of the product of spheres i×d-2-i is constructed for all pairs of non-negative integers i and d with 0≤ i ≤ d-2. For the case of i=d-2-i, the existence of such a triangulation was conjectured by Sparla. The constructed complex admits a vertex-transitive action by a group of order 4d. The crux of this construction is a definition of a certain full-dimensional subcomplex, (i,d), of the boundary complex of the d-dimensional cross-polytope. This complex (i,d) is a combinatorial manifold with boundary and its boundary provides a required triangulation of i×d-i-2. Enumerative characteristics of (i,d) and its boundary, and connections to another conjecture of Sparla are also discussed.