Euclidean -systems and real PK arrangements

Abstract

We establish a correspondence between two structures arising in the geometry of hyperplane arrangements: Euclidean -systems and real polyhedral Kähler (PK) arrangements. We prove that every irreducible Euclidean -system determines a real PK arrangement, and conversely that every real PK arrangement arises this way. As a result, we show that the moduli space of Euclidean -systems in a fixed projective class is homeomorphic to the relative interior of a polytope. We also give a direct proof that the hyperplane arrangement associated with a Euclidean -system is simplicial. Among the currently known simplicial line arrangements, we identify precisely those that arise from -systems. As a consequence, we prove that the Schreiber--Veselov catalog is complete for irreducible rank-three Euclidean -systems with at most 27 vectors.

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