Generalized cohesiveness
Abstract
We study some generalized notions of cohesiveness which arise naturally in connection with effective versions of Ramsey's Theorem. An infinite set of natural numbers is --cohesive (respectively, --r--cohesive) if is almost homogeneous for every computably enumerable (respectively, computable) --coloring of the --element sets of natural numbers. (Thus the --cohesive and --r--cohesive sets coincide with the cohesive and r--cohesive sets, respectively.) We consider the degrees of unsolvability and arithmetical definability levels of --cohesive and --r--cohesive sets. For example, we show that for all , there exists a --cohesive set. We improve this result for by showing that there is a --cohesive set. We show that the --cohesive and --r--cohesive degrees together form a linear, non--collapsing hierarchy of degrees for . In addition, for we characterize the jumps of --cohesive degrees as exactly the degrees and show that each --r--cohesive degree has jump .
Cite
@article{arxiv.math/9709204,
title = {Generalized cohesiveness},
author = {Tamara Hummel and Carl Jockusch},
journal= {arXiv preprint arXiv:math/9709204},
year = {2016}
}