English

Order-preserving unique Hahn-Banach extensions

Functional Analysis 2025-04-07 v1

Abstract

Let XX be a real Banach lattice with a unit, let YXY \subseteq X be a closed subspace containing the unit. In this paper we study the order theoretic (also isometric) structure of YY that it may inherit from XX under some additional conditions. One such condition is to assume that all continuous positive linear functionals in the unit sphere of YY^\ast have unique positive norm preserving extensions in XX^\ast. Our answers depend on the specific nature of the embedding of YY in XX. For a compact convex set KK with closed extreme boundary eK\partial_e K, for the restriction isometry of A(K)A(K) (which is also order-preserving) into C(eK)C(\partial_e K), uniqueness of extensions of positive functionals leads to KK being a simplex and the restriction embedding being onto. On the other hand, for a Choquet simplex KK, under the canonical embedding in the bidual A(K)A(K)^{\ast\ast} (which is an abstract MM-space) uniqueness of extensions implies that KK is a finite dimensional simplex. This gives an order theoretic analogue of a result of Contreras, Payaˊ\acute{a} and Werner, proved in the context of unital CC^\ast-algebras.

Keywords

Cite

@article{arxiv.2504.03386,
  title  = {Order-preserving unique Hahn-Banach extensions},
  author = {Tanmoy Paul and T. S. S. R. K. Rao},
  journal= {arXiv preprint arXiv:2504.03386},
  year   = {2025}
}
R2 v1 2026-06-28T22:46:40.666Z