中文

Pure infiniteness and primary factorisation

泛函分析 2026-07-01 v1 环与代数

摘要

We show that there is no real or complex indecomposable Banach space with the primary factorisation property (PFP). We relate the PFP of a Banach space EE to ring-theoretic infiniteness of B(E)\mathcal{B}(E) and of B(E)/ME\mathcal{B}(E)/\mathcal{M}_E, where ME\mathcal{M}_E denotes the set of operators not factoring the identity on EE, in the case it is the unique maximal ideal of B(E)\mathcal{B}(E). For complex EE with the PFP, this quotient is purely infinite exactly when it is not scalar. We isolate the quantitative gap relevant to ultrapowers, identify classical sequence spaces as positive non-scalar cases, and show that Read's space ERE_{\operatorname{R}} does not have the uniform PFP.

引用

@article{arxiv.2607.01467,
  title  = {Pure infiniteness and primary factorisation},
  author = {Antonio Acuaviva and Bence Horváth and Tomasz Kania},
  journal= {arXiv preprint arXiv:2607.01467},
  year   = {2026}
}

备注

19 pp