A lower bound theorem for centrally symmetric simplicial polytopes
Abstract
Stanley proved that for any centrally symmetric simplicial d-polytope P with d≥ 3, g2(P) ≥ d 2-d. We provide a characterization of centrally symmetric d-polytopes with d≥ 4 that satisfy this inequality as equality. This gives a natural generalization of the classical Lower Bound Theorem for simplicial polytopes to the setting of centrally symmetric simplicial polytopes.
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