A decomposition theorem for Lefschetz modules
Abstract
A Lefschetz module is a module over a graded algebra A that satisfies analogues of Poincar\'e duality, the Hard Lefschetz property, and the Hodge--Riemann relations with respect to an open convex cone K in the degree one part of A. We analyze its decomposition into indecomposable modules over subrings of A that are generated by elements in the closure of K, establishing structural results that parallel the decomposition theorem for morphisms of complex projective varieties. We use our theorems to recover key statements in combinatorial Hodge theory and illuminate the Hodge-theoretic aspects of the decomposition theorem in algebraic geometry.
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