English

Splitting of Tensor Products and Intermediate Factor Theorem: Continuous Version

Operator Algebras 2025-06-18 v4 Dynamical Systems Functional Analysis

Abstract

Let GG be a discrete group. Given unital GG-CC^*-algebras A\mathcal{A} and B\mathcal{B}, we give an abstract condition under which every GG-subalgebra C\mathcal{C} of the form ACAminB\mathcal{A}\subset \mathcal{C}\subset \mathcal{A}\otimes_{\text{min}}\mathcal{B} is a tensor product. This generalizes the well-known splitting results in the context of CC^*-algebras by Zacharias and Zsido. As an application, we prove a topological version of the Intermediate Factor theorem. When a product group G=Γ1×Γ2G=\Gamma_1\times\Gamma_2 acts (by a product action) on the product of corresponding Γi\Gamma_i-boundaries Γi\partial\Gamma_i, using the abstract condition, we show that every intermediate subalgebra C(X)CC(X)minC(Γ1×Γ2)C(X)\subset\mathcal{C}\subset C(X)\otimes_{\text{min}}C(\partial\Gamma_1\times \partial\Gamma_2) is a tensor product (under some additional assumptions on XX). This can be considered as a topological version of the Intermediate Factor theorem. We prove that our assumptions are necessary and cannot generally be relaxed. We also introduce the notion of a uniformly rigid action for CC^*-algebras and use it to give various classes of inclusions AAminB\mathcal{A}\subset \mathcal{A}\otimes_{\text{min}}\mathcal{B} for which every invariant intermediate algebra is a tensor product.

Keywords

Cite

@article{arxiv.2408.08635,
  title  = {Splitting of Tensor Products and Intermediate Factor Theorem: Continuous Version},
  author = {Tattwamasi Amrutam and Yongle Jiang},
  journal= {arXiv preprint arXiv:2408.08635},
  year   = {2025}
}

Comments

Final version. It is going to appear in the Journal of the London Mathematical Society

R2 v1 2026-06-28T18:14:34.883Z