Abstract
We prove that the i th i^\text {th} graded pieces of the Orlik–Solomon algebras or Cordovil algebras of resonance arrangements form a finitely generated FS o p \operatorname {FS}^{\mathrm {op}} -module, thus obtaining information about the growth of their dimensions and restrictions on the irreducible representations of symmetric groups that they contain.
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Schedule a callMore From: Proceedings of the American Mathematical Society, Series B
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