English

Norm Hilbert spaces over G-modules with a convex base

Functional Analysis 2019-09-17 v1

Abstract

By analogy with the classical definition, a Norm Hilbert space EE is defined as a Banach space over a valued field KK in which each closed subspace has an orthocomplement. In the rank one case (that is, the value group as well as the set of norms of the space are contained in [0,)[0, \infty)), they were described by van Rooij in his classical book of 1978, but the name itself was introduced in 1999 by Ochsenius and Schikhof for the case of spaces with an infinite rank valuation. Here we shall also consider only value groups that are contained in (R+,)(\R^+,\cdot), yet we borrow from the infinite rank case the notion of a GG-module for the set of norms of the space. Their structure allows for greater complexity than that of ordered subsets of R\R. In this paper we describe a new class of Norm Hilbert spaces, those in which the GG-module has a convex base. Their characteristics will be the focus of our study.

Keywords

Cite

@article{arxiv.1909.06602,
  title  = {Norm Hilbert spaces over G-modules with a convex base},
  author = {Elena Olivos and Herminia Ochsenius},
  journal= {arXiv preprint arXiv:1909.06602},
  year   = {2019}
}
R2 v1 2026-06-23T11:15:19.161Z