Abstract
In this paper we prove two inequalities. The first one gives a lower bound for the Euler characteristic of a tight combinatorial 4-manifold M under the additional assumptions that |M| is 1-connected, that M is a subcomplex of H(M) , and that H(M) is a centrally symmetric and simplicial d -polytope. The second inequality relates the Euler characteristic with the number of vertices of a combinatorial 4-manifold admitting a fixed-point free involution. Furthermore, we construct a new and highly symmetric 12-vertex triangulation of S2 x S2 realizing equality in each of these inequalities.
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