The $δ$-vectors of reflexive polytopes and of the dual polytopes
Abstract: Let $\delta(\mathcal{P})$ be the $\delta$-vector of a reflexive polytope $\mathcal{P} \subset \mathbb{R}d$ of dimension $d$ and $\delta(\mathcal{P} \vee)$ the $\delta$-vector of the dual polytope $\mathcal{P}\vee \subset \mathbb{R}d$. In general, $\delta(\mathcal{P})=\delta(\mathcal{P}\vee)$ does not hold. In this paper, we give a higher-dimensional construction of reflexive polytope whose $\delta$-vector equals the $\delta$-vector of the dual polytope. In particular, we consider the case that the reflexive polytope and the dual polytope are unimodularly equivalent.
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