English

Linear structures on locales

Category Theory 2016-11-28 v6

Abstract

We define a notion of morphism for quotient vector bundles that yields both a category QVBun\textit{QVBun} and a contravariant global sections functor C:QVBunopVectC:\textit{QVBun}^{\textrm{op}}\to\textit{Vect} whose restriction to trivial vector bundles with fiber FF coincides with the contravariant functor TopopVect\textit{Top}^{\textrm{op}}\to\textit{Vect} of FF-valued continuous functions. Based on this we obtain a linear extension of the adjunction between the categories of topological spaces and locales: (i) a linearized topological space is a spectral vector bundle, by which is meant a mildly restricted type of quotient vector bundle; (ii) a linearized locale is a locale \triangle equipped with both a topological vector space AA and a \triangle-valued support map for the elements of AA satisfying a continuity condition relative to the spectrum of \triangle and the lower Vietoris topology on SubA\operatorname{Sub} A; (iii) we obtain an adjunction between the full subcategory of spectral vector bundles QVBunΣ\textit{QVBun}_{\Sigma} and the category of linearized locales LinLoc\textit{LinLoc}, which restricts to an equivalence of categories between sober spectral vector bundles and spatial linearized locales. The spectral vector bundles are classified by a finer topology on SubA\operatorname{Sub} A, called the open support topology, but there is no notion of universal spectral vector bundle for an arbitrary topological vector space AA.

Keywords

Cite

@article{arxiv.1603.06435,
  title  = {Linear structures on locales},
  author = {Pedro Resende and João Paulo Santos},
  journal= {arXiv preprint arXiv:1603.06435},
  year   = {2016}
}

Comments

40 pages. Version 5 differs from 4 only in typesetting style and in the numbering of theorems, lemmas and examples (which now coincides with that of the published version). Version 6 corrects typos in pp. 2 and 20 ("span" was missing in the definition of gamma), and in the proof of Th. 6.16

R2 v1 2026-06-22T13:15:15.969Z