English

Analytic computable structure theory and $L^p$ spaces

Logic 2018-04-11 v5

Abstract

We continue the investigation of analytic spaces from the perspective of computable structure theory. We show that if p1p \geq 1 is a computable real, and if Ω\Omega is a nonzero, non-atomic, and separable measure space, then every computable presentation of Lp(Ω)L^p(\Omega) is computably linearly isometric to the standard computable presentation of Lp[0,1]L^p[0,1]; in particular, Lp[0,1]L^p[0,1] is computably categorical. We also show that there is a measure space Ω\Omega that does not have a computable presentation even though Lp(Ω)L^p(\Omega) does for every computable real p1p \geq 1.

Keywords

Cite

@article{arxiv.1701.00840,
  title  = {Analytic computable structure theory and $L^p$ spaces},
  author = {Joe Clanin and Timothy H. McNicholl and Don Stull},
  journal= {arXiv preprint arXiv:1701.00840},
  year   = {2018}
}
R2 v1 2026-06-22T17:40:26.935Z