English

Simultaneous power factorization in modules over Banach algebras

Functional Analysis 2017-05-30 v2

Abstract

Let AA be a Banach algebra with a bounded left approximate identity {eλ}λΛ\{e_\lambda\}_{\lambda\in\Lambda}, let π\pi be a continuous representation of AA on a Banach space XX, and let SS be a non-empty subset of XX such that limλπ(eλ)s=s\lim_{\lambda}\pi(e_\lambda)s=s uniformly on SS. If SS is bounded, or if {eλ}λΛ\{e_\lambda\}_{\lambda\in\Lambda} is commutative, then we show that there exist aAa\in A and maps xn:SXx_n: S\to X for n1n\geq 1 such that s=π(an)xn(s)s=\pi(a^n)x_n(s) for all n1n\geq 1 and sSs\in S. The properties of aAa\in A and the maps xnx_n, as produced by the constructive proof, are studied in some detail. The results generalize previous simultaneous factorization theorems as well as Allan and Sinclair's power factorization theorem. In an ordered context, we also consider the existence of a positive factorization for a subset of the positive cone of an ordered Banach space that is a positive module over an ordered Banach algebra with a positive bounded left approximate identity. Such factorizations are not always possible. In certain cases, including those for positive modules over ordered Banach algebras of bounded functions, such positive factorizations exist, but the general picture is still unclear. Furthermore, simultaneous pointwise power factorizations for sets of bounded maps with values in a Banach module (such as sets of bounded convergent nets) are obtained. A worked example for the left regular representation of C0(R)\mathrm{C}_0({\mathbb R}) and unbounded SS is included.

Keywords

Cite

@article{arxiv.1610.01885,
  title  = {Simultaneous power factorization in modules over Banach algebras},
  author = {Marcel de Jeu and Xingni Jiang},
  journal= {arXiv preprint arXiv:1610.01885},
  year   = {2017}
}

Comments

Some minor editorial corrections have been made. Final version, to appear in Positivity

R2 v1 2026-06-22T16:13:07.991Z