English

On logical parameterizations and functional representability in local set theories

Logic 2024-02-15 v2 Category Theory

Abstract

There is a well-known inclusion ιE\iota_\mathscr{E} of a topos E\mathscr{E} in the linguistic topos T(Σ)\mathscr{T}(\Sigma) of its internal language Σ\Sigma that proves both toposes to be equivalent. There is also a canonical translation ηS\eta_S for any local set theory SS into the local set theory Σ\Sigma of its linguistic topos. Starting from a local set theory, this yields two a priori distinct inclusions from T(S)\mathscr{T}(S) to T(Σ)\mathscr{T}(\Sigma). Herein, these two functors are proved to be isomorphic. Furthermore, the concept of logical parameterization is investigated and then applied to see that ιT(S)\iota_{\mathscr{T}(S)} parameterizes T(ηS)\mathscr{T}(\eta_S) in such a way that syntactic SS-functions are represented by themselves in Σ\Sigma.

Cite

@article{arxiv.2104.07405,
  title  = {On logical parameterizations and functional representability in local set theories},
  author = {Enrique Ruiz Hernández and Pedro Solórzano},
  journal= {arXiv preprint arXiv:2104.07405},
  year   = {2024}
}

Comments

28 pages. New Introductory text

R2 v1 2026-06-24T01:11:50.611Z