English

Against Cumulative Type Theory

Logic 2021-08-11 v1 History and Overview

Abstract

Standard Type Theory, STT, tells us that bn(am)b^n(a^m) is well-formed iff n=m+1n=m+1. However, Linnebo and Rayo (2012) have advocated for the use of Cumulative Type Theory, CTT, which has more relaxed type-restrictions: according to CTT, bβ(aα)b^\beta(a^\alpha) is well-formed iff β>α\beta > \alpha. In this paper, we set ourselves against CTT. We begin our case by arguing against Linnebo & Rayo's claim that CTT sheds new philosophical light on set theory. We then argue that, while CTT's type-restrictions are unjustifiable, the type-restrictions imposed by STT are justified by a Fregean semantics. What is more, this Fregean semantics provides us with a principled way to resist Linnebo & Rayo's Semantic Argument for CTT. We end by examining an alternative approach to cumulative types due to Florio & Jones (2021); we argue that their theory is best seen as a misleadingly formulated version of STT.

Cite

@article{arxiv.2108.04582,
  title  = {Against Cumulative Type Theory},
  author = {Tim Button and Robert Trueman},
  journal= {arXiv preprint arXiv:2108.04582},
  year   = {2021}
}

Comments

Forthcoming in Review of Symbolic Logic

R2 v1 2026-06-24T04:59:03.977Z