English

Isometric $F$-spaces of $log$-integrable function

Functional Analysis 2019-09-27 v1

Abstract

Let (Ωi,Ai,μi)(\Omega_i,\mathcal A_i,\mu_i) be a measure space with finite measure μi\mu_i, and let (Llog(Ωi,Ai,μi),log,μi)(L_{\log}(\Omega_i, \mathcal A_i,\mu_i), \|\cdot\|_{\log,\mu_i}) be a FF-space of all log\log-integrable functions on (Ωi,Ai,μ1), i=1,2(\Omega_i,\mathcal A_i,\mu_1), \ i =1, 2 . It is proved that FF-spaces (Llog(Ω1,A1,μ1),log,μ1)(L_{\log}(\Omega_1, \mathcal A_1,\mu_1), \|\cdot\|_{\log,\mu_1}) \and \ (Llog(Ω2,A2,μ2),log,μ2)(L_{\log}(\Omega_2, \mathcal A_2,\mu_2), \|\cdot\|_{\log,\mu_2}) are isometric if and only if there exists a measure preserving isomorphism from (Ω1,A1,μ1)(\Omega_1, \mathcal A_1,\mu_1) onto (Ω2,A2,μ2)(\Omega_2, \mathcal A_2,\mu_2).

Keywords

Cite

@article{arxiv.1909.11876,
  title  = {Isometric $F$-spaces of $log$-integrable function},
  author = {R. Abdullaev and V. Chilin and B. Madaminov},
  journal= {arXiv preprint arXiv:1909.11876},
  year   = {2019}
}
R2 v1 2026-06-23T11:26:23.685Z