English

Arithmetic Period Map and Complex Multiplication for Cubic Fourfolds

Number Theory 2025-12-15 v1 Algebraic Geometry

Abstract

We construct an arithmetic period map for cubic fourfolds, in direct analogy with Rizov's work on K3 surfaces. For each N1N\geq 1, we introduce a Deligne-Mumford stack C[N]~\widetilde{\mathcal{C}^{[N]}} of cubic fourfolds with level structure and prove that the associated period map jN:C[N]~CShKN(L)Cj_{N}:\widetilde{\mathcal{C}^{[N]}}_{\mathbb{C}}\to {\rm Sh}_{K_{N}}(L)_{\mathbb{C}} is algebraic, \'etale, and descends to Q\mathbb{Q} whenever NN is coprime to 23102310. As an application, we develop complex multiplication theory for cubic fourfolds and show that every cubic fourfold of CM type is defined over an abelian extension of its reflex field. Moreover, using the CM theory for rank-21 cubic fourfolds, we provide an alternative proof of the modularity of rank-21 cubic fourfolds established by Livn\'e.

Keywords

Cite

@article{arxiv.2512.11355,
  title  = {Arithmetic Period Map and Complex Multiplication for Cubic Fourfolds},
  author = {Rikuto Ito},
  journal= {arXiv preprint arXiv:2512.11355},
  year   = {2025}
}

Comments

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R2 v1 2026-07-01T08:21:55.094Z