English

Generalized cohesiveness

Logic 2016-09-07 v1

Abstract

We study some generalized notions of cohesiveness which arise naturally in connection with effective versions of Ramsey's Theorem. An infinite set AA of natural numbers is nn--cohesive (respectively, nn--r--cohesive) if AA is almost homogeneous for every computably enumerable (respectively, computable) 22--coloring of the nn--element sets of natural numbers. (Thus the 11--cohesive and 11--r--cohesive sets coincide with the cohesive and r--cohesive sets, respectively.) We consider the degrees of unsolvability and arithmetical definability levels of nn--cohesive and nn--r--cohesive sets. For example, we show that for all n2n \ge 2, there exists a Δn+10\Delta^0_{n+1} nn--cohesive set. We improve this result for n=2n = 2 by showing that there is a Π20\Pi^0_2 22--cohesive set. We show that the nn--cohesive and nn--r--cohesive degrees together form a linear, non--collapsing hierarchy of degrees for n2n \geq 2. In addition, for n2n \geq 2 we characterize the jumps of nn--cohesive degrees as exactly the degrees \jump0(n+1){\bf \geq \jump{0}{(n+1)}} and show that each nn--r--cohesive degree has jump >\jump0(n){\bf > \jump{0}{(n)}}.

Keywords

Cite

@article{arxiv.math/9709204,
  title  = {Generalized cohesiveness},
  author = {Tamara Hummel and Carl Jockusch},
  journal= {arXiv preprint arXiv:math/9709204},
  year   = {2016}
}