Amoeba-shaped polyhedral complex of an algebraic hypersurface
classification
🧮 math.AG
keywords
complexpolyhedralhypersurfacealgebraicamoebadefiningnewtonpolynomial
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Given a complex algebraic hypersurface~$H$, we introduce a polyhedral complex which is a subset of the Newton polytope of the defining polynomial for~$H$ and enjoys the key topological and combinatorial properties of the amoeba of~$H.$ We provide an explicit formula for this polyhedral complex in the case when the spine of the amoeba is dual to a triangulation of the Newton polytope of the defining polynomial. In particular, this yields a description of the polyhedral complex when the hypersurface is optimal.
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