Lorenzo Carlucci
Published 2016-10-24Version 1
We present a natural restriction of Hindman's Finite Sums Theorem that admits a simple combinatorial proof (one that does not also prove the full Finite Sums Theorem) and low computability-theoretic and proof-theoretic upper bounds, yet implies the existence of the Turing Jump, thus realizing the only known lower bound for the full Finite Sums Theorem. This is the first example of this kind. In fact we isolate a rich family of similar restrictions of Hindman's Theorem with analogous properties.
Related articles:
A Simple Combinatorial Proof of Szemerédi's Theorem via Three Levels of Infinities
New bounds on the strength of some restrictions of Hindman's Theorem
A weak variant of Hindman's Theorem stronger than Hilbert's Theorem
![QR code for arXiv:1610.07500 [math.LO]](http://oss.arxitics.com/images/favicon.svg)